Eigenvalues and eigenvectors

19744: 24537: 25377: 10233: 702: 16684: 16691: 9834: 689: 24338: 1826: 1210: 25389: 24801: 8883: 19079: 16714: 1511: 25413: 16698: 10228:{\displaystyle {\begin{aligned}\det(A-\lambda I)&=\left|{\begin{bmatrix}2&0&0\\0&3&4\\0&4&9\end{bmatrix}}-\lambda {\begin{bmatrix}1&0&0\\0&1&0\\0&0&1\end{bmatrix}}\right|={\begin{vmatrix}2-\lambda &0&0\\0&3-\lambda &4\\0&4&9-\lambda \end{vmatrix}},\\&=(2-\lambda ){\bigl }=-\lambda ^{3}+14\lambda ^{2}-35\lambda +22.\end{aligned}}} 25401: 16705: 8618: 9552: 24214: 21253: 12524: 22173:(One knows, moreover, that by following Lagrange's method, one obtains for the general value of the principal variable a function in which there appear, together with the principal variable, the roots of a certain equation that I will call the "characteristic equation", the degree of this equation being precisely the order of the differential equation that must be integrated.) 21922: 12071: 12875: 11374: 11191: 718:. Points in the top half are moved to the right, and points in the bottom half are moved to the left, proportional to how far they are from the horizontal axis that goes through the middle of the painting. The vectors pointing to each point in the original image are therefore tilted right or left, and made longer or shorter by the transformation. Points 10688: 9286: 1821:{\displaystyle {\begin{bmatrix}A_{11}&A_{12}&\cdots &A_{1n}\\A_{21}&A_{22}&\cdots &A_{2n}\\\vdots &\vdots &\ddots &\vdots \\A_{n1}&A_{n2}&\cdots &A_{nn}\\\end{bmatrix}}{\begin{bmatrix}v_{1}\\v_{2}\\\vdots \\v_{n}\end{bmatrix}}={\begin{bmatrix}w_{1}\\w_{2}\\\vdots \\w_{n}\end{bmatrix}}} 3372: 12323: 17845: 8514:= . The red vectors are not parallel to either eigenvector, so, their directions are changed by the transformation. The lengths of the purple vectors are unchanged after the transformation (due to their eigenvalue of 1), while blue vectors are three times the length of the original (due to their eigenvalue of 3). See also: 17649: 14228: 9077: 8878:{\displaystyle {\begin{aligned}\det(A-\lambda I)&=\left|{\begin{bmatrix}2&1\\1&2\end{bmatrix}}-\lambda {\begin{bmatrix}1&0\\0&1\end{bmatrix}}\right|={\begin{vmatrix}2-\lambda &1\\1&2-\lambda \end{vmatrix}}\\&=3-4\lambda +\lambda ^{2}\\&=(\lambda -3)(\lambda -1).\end{aligned}}} 11883: 14051: 18771: 18953: 18645: 12665: 11196: 11013: 4212:

Because of the definition of eigenvalues and eigenvectors, an eigenvalue's geometric multiplicity must be at least one, that is, each eigenvalue has at least one associated eigenvector. Furthermore, an eigenvalue's geometric multiplicity cannot exceed its algebraic multiplicity. Additionally, recall

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the horizontal axis do not move at all when this transformation is applied. Therefore, any vector that points directly to the right or left with no vertical component is an eigenvector of this transformation, because the mapping does not change its direction. Moreover, these eigenvectors all have an

7986: 21212:. In this case, the term eigenvector is used in a somewhat more general meaning, since the Fock operator is explicitly dependent on the orbitals and their eigenvalues. Thus, if one wants to underline this aspect, one speaks of nonlinear eigenvalue problems. Such equations are usually solved by an 3545: 21991:

represent the general direction of variability in human pronunciations of a particular utterance, such as a word in a language. Based on a linear combination of such eigenvoices, a new voice pronunciation of the word can be constructed. These concepts have been found useful in automatic speech

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The converse approach, of first seeking the eigenvectors and then determining each eigenvalue from its eigenvector, turns out to be far more tractable for computers. The easiest algorithm here consists of picking an arbitrary starting vector and then repeatedly multiplying it with the matrix

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are all real numbers, then the coefficients of the characteristic polynomial will also be real numbers, but the eigenvalues may still have nonzero imaginary parts. The entries of the corresponding eigenvectors therefore may also have nonzero imaginary parts. Similarly, the eigenvalues may be

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Eigenvalues and eigenvectors are often introduced to students in the context of linear algebra courses focused on matrices. Furthermore, linear transformations over a finite-dimensional vector space can be represented using matrices, which is especially common in numerical and computational

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the vectors upon which it acts. Its eigenvectors are those vectors that are only stretched, with neither rotation nor shear. The corresponding eigenvalue is the factor by which an eigenvector is stretched or squished. If the eigenvalue is negative, the eigenvector's direction is reversed.

2993: 20296: 10526: 15825: 10894: 6099: 5474: 13225: 12660: 3174: 2799: 11562: 11471: 9257: 21310:, eigenvectors and eigenvalues are used as a method by which a mass of information of a clast fabric's constituents' orientation and dip can be summarized in a 3-D space by six numbers. In the field, a geologist may collect such data for hundreds or thousands of 16628:

Most numeric methods that compute the eigenvalues of a matrix also determine a set of corresponding eigenvectors as a by-product of the computation, although sometimes implementors choose to discard the eigenvector information as soon as it is no longer needed.

14106: 9675: 7840: 15374: 11006: 17055: 8924: 9547:{\displaystyle {\begin{aligned}(A-3I)\mathbf {v} _{\lambda =3}&={\begin{bmatrix}-1&1\\1&-1\end{bmatrix}}{\begin{bmatrix}v_{1}\\v_{2}\end{bmatrix}}={\begin{bmatrix}0\\0\end{bmatrix}}\\-1v_{1}+1v_{2}&=0;\\1v_{1}-1v_{2}&=0\end{aligned}}} 2544: 17702: 13920: 16923: 17494: 14837: 15459:

In theory, the coefficients of the characteristic polynomial can be computed exactly, since they are sums of products of matrix elements; and there are algorithms that can find all the roots of a polynomial of arbitrary degree to any required

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with odd order has at least one real eigenvalue, whereas a real matrix with even order may not have any real eigenvalues. The eigenvectors associated with these complex eigenvalues are also complex and also appear in complex conjugate pairs.

12519:{\displaystyle \mathbf {v} _{\lambda _{1}}={\begin{bmatrix}1\\-1\\{\frac {1}{2}}\end{bmatrix}},\quad \mathbf {v} _{\lambda _{2}}={\begin{bmatrix}0\\1\\-3\end{bmatrix}},\quad \mathbf {v} _{\lambda _{3}}={\begin{bmatrix}0\\0\\1\end{bmatrix}},} 6231: 3756: 3401: 16642:

Eigenvectors and eigenvalues can be useful for understanding linear transformations of geometric shapes. The following table presents some example transformations in the plane along with their 2×2 matrices, eigenvalues, and eigenvectors.

17488: 16534: 8394: 1987: 22167:"On sait d'ailleurs qu'en suivant la méthode de Lagrange, on obtient pour valeur générale de la variable prinicipale une fonction dans laquelle entrent avec la variable principale les racines d'une certaine équation que j'appellerai l' 19709:

represented by the row-normalized adjacency matrix; however, the adjacency matrix must first be modified to ensure a stationary distribution exists. The second smallest eigenvector can be used to partition the graph into clusters, via

12184: 11744: 10515: 9823: 7537: 4452: 1244: 18651: 18836: 2877: 18531: 15919: 16011: 251:). In such an application, the largest eigenvalue is of particular importance, because it governs the long-term behavior of the system after many applications of the linear transformation, and the associated eigenvector is the 18517: 18413: 18343: 13886: 12066:{\displaystyle \mathbf {v} _{\lambda _{1}}={\begin{bmatrix}1\\0\\0\end{bmatrix}},\quad \mathbf {v} _{\lambda _{2}}={\begin{bmatrix}0\\1\\0\end{bmatrix}},\quad \mathbf {v} _{\lambda _{3}}={\begin{bmatrix}0\\0\\1\end{bmatrix}},} 7871: 22246: 15716: 10765: 12968: 13028: 18181: 18077: 18007: 5354: 15037: 13062: 11642: 7168:

Many disciplines traditionally represent vectors as matrices with a single column rather than as matrices with a single row. For that reason, the word "eigenvector" in the context of matrices almost always refers to a

4208: 15187: 12539: 10355: 12870:{\displaystyle \det(A-\lambda I)={\begin{vmatrix}2-\lambda &0&0&0\\1&2-\lambda &0&0\\0&1&3-\lambda &0\\0&0&1&3-\lambda \end{vmatrix}}=(2-\lambda )^{2}(3-\lambda )^{2}.} 10413: 10295: 19730:

between states of a system. In particular the entries are non-negative, and every row of the matrix sums to one, being the sum of probabilities of transitions from one state to some other state of the system. The

11369:{\displaystyle A{\begin{bmatrix}1\\\lambda _{3}\\\lambda _{2}\end{bmatrix}}={\begin{bmatrix}\lambda _{3}\\\lambda _{2}\\1\end{bmatrix}}=\lambda _{3}\cdot {\begin{bmatrix}1\\\lambda _{3}\\\lambda _{2}\end{bmatrix}}.} 11186:{\displaystyle A{\begin{bmatrix}1\\\lambda _{2}\\\lambda _{3}\end{bmatrix}}={\begin{bmatrix}\lambda _{2}\\\lambda _{3}\\1\end{bmatrix}}=\lambda _{2}\cdot {\begin{bmatrix}1\\\lambda _{2}\\\lambda _{3}\end{bmatrix}},} 6518: 4285: 12279: 11839: 16842: 16301: 14688: 7032: 16095: 4502: 18830: 2684: 833: 21374: 2170: 8623: 8582: 2870: 2661: 705:

A 2×2 real and symmetric matrix representing a stretching and shearing of the plane. The eigenvectors of the matrix (red lines) are the two special directions such that every point on them will just slide on

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the red arrow changes direction, but the blue arrow does not. The blue arrow is an eigenvector of this shear mapping because it does not change direction, and since its length is unchanged, its eigenvalue is

22097:"Théorem. 44. De quelque figure que soit le corps, on y peut toujours assigner un tel axe, qui passe par son centre de gravité, autour duquel le corps peut tourner librement & d'un mouvement uniforme." 15677: 9149: 2049: 21859:, from one person becoming infected to the next person becoming infected. In a heterogeneous population, the next generation matrix defines how many people in the population will become infected after time 21101:

correspond to the intensity transmittance associated with each eigenchannel. One of the remarkable properties of the transmission operator of diffusive systems is their bimodal eigenvalue distribution with

14961: 5953: 22891: 16977: 16774: 9573: 22199:"Insbesondere in dieser ersten Mitteilung gelange ich zu Formeln, die die Entwickelung einer willkürlichen Funktion nach gewissen ausgezeichneten Funktionen, die ich 'Eigenfunktionen' nenne, liefern: ..." 5164: 4345: 20991:. Even though multiple scattering repeatedly randomizes the waves, ultimately coherent wave transport through the system is a deterministic process which can be described by a field transmission matrix 9839: 7151: 714:, provides a simple illustration. Each point on the painting can be represented as a vector pointing from the center of the painting to that point. The linear transformation in this example is called a 21047:

form a set of disorder-specific input wavefronts which enable waves to couple into the disordered system's eigenchannels: the independent pathways waves can travel through the system. The eigenvalues,

10901: 10683:{\displaystyle {\begin{aligned}\lambda _{1}&=1\\\lambda _{2}&=-{\frac {1}{2}}+i{\frac {\sqrt {3}}{2}}\\\lambda _{3}&=\lambda _{2}^{*}=-{\frac {1}{2}}-i{\frac {\sqrt {3}}{2}}\end{aligned}}} 6911: 6378: 20208: 22099:(Theorem. 44. Whatever be the shape of the body, one can always assign to it such an axis, which passes through its center of gravity, around which it can rotate freely and with a uniform motion.) 20760: 19244:

for the space of the observed data: In this basis, the largest eigenvalues correspond to the principal components that are associated with most of the covariability among a number of observed data.

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can therefore be decomposed into a matrix composed of its eigenvectors, a diagonal matrix with its eigenvalues along the diagonal, and the inverse of the matrix of eigenvectors. This is called the

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Linear transformations can take many different forms, mapping vectors in a variety of vector spaces, so the eigenvectors can also take many forms. For example, the linear transformation could be a

17225: 13738: 6801: 659: 21099: 21045: 18841: 18656: 18536: 18458: 18354: 18284: 18122: 18018: 17948: 17707: 17499: 17415: 15939: 15844: 14111: 13925: 10531: 9291: 7270: 5359: 3406: 896: 11476: 11385: 7339: 1413: 489: 179: 18239: 13488: 5832: 5259: 4725: 17167: 11880:

Each diagonal element corresponds to an eigenvector whose only nonzero component is in the same row as that diagonal element. In the example, the eigenvalues correspond to the eigenvectors,

7758: 24236: 20140: 19061: 17903: 17696: 17404: 15202: 4973: 3367:{\displaystyle \det(A-\lambda I)=(\lambda _{1}-\lambda )^{\mu _{A}(\lambda _{1})}(\lambda _{2}-\lambda )^{\mu _{A}(\lambda _{2})}\cdots (\lambda _{d}-\lambda )^{\mu _{A}(\lambda _{d})}.} 1506: 21427: 16983: 5329: 1451: 17840:{\displaystyle {\begin{aligned}\lambda _{1}&=e^{\varphi }\\&=\cosh \varphi +\sinh \varphi \\\lambda _{2}&=e^{-\varphi }\\&=\cosh \varphi -\sinh \varphi \end{aligned}}} 21762: 20470: 15398:

The classical method is to first find the eigenvalues, and then calculate the eigenvectors for each eigenvalue. It is in several ways poorly suited for non-exact arithmetics such as

13569: 6939: 4600: 3682: 19016: 5918: 5875: 2436: 20368: 4813: 4558: 4381: 4092: 21709: 19620: 16417: 15600:.) Therefore, for matrices of order 5 or more, the eigenvalues and eigenvectors cannot be obtained by an explicit algebraic formula, and must therefore be computed by approximate 1831: 20907: 19430: 12100: 11660: 10431: 9739: 8432: 7476: 2305: 20962: 20798: 20695: 17644:{\displaystyle {\begin{aligned}\lambda _{1}&=e^{i\theta }\\&=\cos \theta +i\sin \theta \\\lambda _{2}&=e^{-i\theta }\\&=\cos \theta -i\sin \theta \end{aligned}}} 17268: 17105: 16848: 13371: 8155: 8100: 21656: 19814: 14223:{\displaystyle {\begin{aligned}T(\mathbf {u} +\mathbf {v} )&=\lambda (\mathbf {u} +\mathbf {v} ),\\T(\alpha \mathbf {v} )&=\lambda (\alpha \mathbf {v} ).\end{aligned}}} 21514: 21485: 21456: 19996: 19858: 16566: 13423: 8193:

and Λ represent the same linear transformation expressed in two different bases. The eigenvectors are used as the basis when representing the linear transformation as Λ.

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The eigenvectors and eigenvalues of a linear transformation serve to characterize it, and so they play important roles in all the areas where linear algebra is applied, from

16386: 15835: 22209:"Dieser Erfolg ist wesentlich durch den Umstand bedingt, daß ich nicht, wie es bisher geschah, in erster Linie auf den Beweis für die Existenz der Eigenwerte ausgehe, ... " 19148: 18447: 18273: 8041: 5551: 5031: 389: 21011: 17357: 16592: 16443: 14707: 8416: 5286: 445: 411: 364: 315: 99: 23323: 20023: 9072:{\displaystyle (A-I)\mathbf {v} _{\lambda =1}={\begin{bmatrix}1&1\\1&1\end{bmatrix}}{\begin{bmatrix}v_{1}\\v_{2}\end{bmatrix}}={\begin{bmatrix}0\\0\end{bmatrix}}} 289: 21168:. Furthermore, one of the striking properties of open eigenchannels, beyond the perfect transmittance, is the statistically robust spatial profile of the eigenchannels. 18111: 17937: 16210: 16161: 13822: 6968: 4679: 24330: 20633: 20590: 20528: 15500: 15454: 13662: 7407: 7205: 6749: 5786: 22319: 19549: 10749: 6134: 5106: 211: 143: 22202:(In particular, in this first report I arrive at formulas that provide the development of an arbitrary function in terms of some distinctive functions, which I call 20043: 15616:

Once the (exact) value of an eigenvalue is known, the corresponding eigenvectors can be found by finding nonzero solutions of the eigenvalue equation, that becomes a

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there is no general, explicit and exact algebraic formula for the roots of a polynomial with degree 5 or more. (Generality matters because any polynomial with degree

7471: 7361: 5213: 4911: 4882: 19484: 16245: 14046:{\displaystyle {\begin{aligned}T(\mathbf {x} +\mathbf {y} )&=T(\mathbf {x} )+T(\mathbf {y} ),\\T(\alpha \mathbf {x} )&=\alpha T(\mathbf {x} ),\end{aligned}}} 6458: 4751: 21911: 21884: 21857: 21830: 21803: 21603: 21576: 21549: 21065: 19511: 19116: 17410: 16471: 15711: 8492: 8336: 6575: 6302: 21805:) is a fundamental number in the study of how infectious diseases spread. If one infectious person is put into a population of completely susceptible people, then 16042: 7081: 20655:

can be represented as a one-dimensional array (i.e., a vector) and a matrix respectively. This allows one to represent the Schrödinger equation in a matrix form.

19358: 18766:{\displaystyle {\begin{aligned}\mathbf {u} _{1}&={\begin{bmatrix}1\\-i\end{bmatrix}}\\\mathbf {u} _{2}&={\begin{bmatrix}1\\+i\end{bmatrix}}\end{aligned}}} 11581: 6827: 18948:{\displaystyle {\begin{aligned}\mathbf {u} _{1}&={\begin{bmatrix}1\\1\end{bmatrix}}\\\mathbf {u} _{2}&={\begin{bmatrix}1\\-1\end{bmatrix}}\end{aligned}}} 15523: 13252: 10519:

This matrix shifts the coordinates of the vector up by one position and moves the first coordinate to the bottom. Its characteristic polynomial is 1 −

4389: 4141: 338: 22283: 22212:(This success is mainly attributable to the fact that I do not, as it has happened until now, first of all aim at a proof of the existence of eigenvalues, ... ) 20927: 20862: 20842: 20822: 20653: 20552: 20493: 20412: 20071: 19947: 19923: 19903: 19880: 19680: 19660: 19640: 19569: 19454: 19324: 18640:{\displaystyle {\begin{aligned}\mathbf {u} _{1}&={\begin{bmatrix}1\\0\end{bmatrix}}\\\mathbf {u} _{2}&={\begin{bmatrix}0\\1\end{bmatrix}}\end{aligned}}} 16463: 16321: 16184: 16135: 16115: 15598: 15574: 15550: 15428: 10708: 8328: 7663: 7643: 7565: 7451: 7427: 7381: 7300: 7225: 7052: 6847: 6723: 6653: 6626: 6595: 6545: 6428: 6401: 6322: 6275: 6255: 6127: 5946: 5760: 5731: 5676: 5656: 5575: 5518: 5498: 5349: 5187: 4993: 4853: 4833: 4640: 4620: 4522: 119: 23997: 22122:(However, it is not inconsistent be three such positions of the plane HM, because in cubic equations, can be three roots, and three values of the tangent t.) 15390:

The calculation of eigenvalues and eigenvectors is a topic where theory, as presented in elementary linear algebra textbooks, is often very far from practice.

6632:, positive-semidefinite, negative-definite, or negative-semidefinite, then every eigenvalue is positive, non-negative, negative, or non-positive, respectively. 4220: 19063:; and all eigenvectors have non-real entries. Indeed, except for those special cases, a rotation changes the direction of every nonzero vector in the plane. 12195: 11755: 15930: 7981:{\displaystyle AQ={\begin{bmatrix}\lambda _{1}\mathbf {v} _{1}&\lambda _{2}\mathbf {v} _{2}&\cdots &\lambda _{n}\mathbf {v} _{n}\end{bmatrix}}.} 18453: 18349: 18279: 247:. In particular, it is often the case that a system is represented by a linear transformation whose outputs are fed as inputs to the same transformation ( 23613:

Knox-Robinson, C.; Gardoll, Stephen J. (1998), "GIS-stereoplot: an interactive stereonet plotting module for ArcView 3.0 geographic information system",

20988: 3540:{\displaystyle {\begin{aligned}1&\leq \mu _{A}(\lambda _{i})\leq n,\\\mu _{A}&=\sum _{i=1}^{d}\mu _{A}\left(\lambda _{i}\right)=n.\end{aligned}}} 3052:

of a matrix is the list of eigenvalues, repeated according to multiplicity; in an alternative notation the set of eigenvalues with their multiplicities.

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is often used in this context. A vector, which represents a state of the system, in the Hilbert space of square integrable functions is represented by

14455:) does not exist. The converse is true for finite-dimensional vector spaces, but not for infinite-dimensional vector spaces. In general, the operator ( 8525: 2604: 1065:

developed Fourier's ideas further, and brought them to the attention of Cauchy, who combined them with his own ideas and arrived at the fact that real

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of the vector space. Hence, in a finite-dimensional vector space, it is equivalent to define eigenvalues and eigenvectors using either the language of

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gives sufficient conditions for a Markov chain to have a unique dominant eigenvalue, which governs the convergence of the system to a steady state.

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is the eigenfunction of the derivative operator. In this case the eigenfunction is itself a function of its associated eigenvalue. In particular, for

12910: 20374:(increasing across: s, p, d, ...). The illustration shows the square of the absolute value of the wavefunctions. Brighter areas correspond to higher 12973: 3029:, namely with the two members of each pair having imaginary parts that differ only in sign and the same real part. If the degree is odd, then by the 18117: 18013: 17943: 14318:, i.e., the maximum number of linearly independent eigenvectors associated with that eigenvalue. By the definition of eigenvalues and eigenvectors, 12970:

and is therefore 1-dimensional. Similarly, the geometric multiplicity of the eigenvalue 3 is 1 because its eigenspace is spanned by just one vector

21271: 14970: 1354:{\displaystyle \mathbf {x} ={\begin{bmatrix}1\\-3\\4\end{bmatrix}}\quad {\mbox{and}}\quad \mathbf {y} ={\begin{bmatrix}-20\\60\\-80\end{bmatrix}}.} 20223:

so that the system can be represented as linear summation of the eigenvectors. The eigenvalue problem of complex structures is often solved using

2988:{\displaystyle \mathbf {v} _{\lambda =1}={\begin{bmatrix}1\\-1\end{bmatrix}},\quad \mathbf {v} _{\lambda =3}={\begin{bmatrix}1\\1\end{bmatrix}}.} 15100: 10302: 24837: 22664: 20283:

tensor with the eigenvalues on the diagonal and eigenvectors as a basis. Because it is diagonal, in this orientation, the stress tensor has no

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th smallest eigenvalue of the Laplacian. The first principal eigenvector of the graph is also referred to merely as the principal eigenvector.

10363: 10245: 22120:"Non autem repugnat tres esse eiusmodi positiones plani HM, quia in aequatione cubica radices tres esse possunt, et tres tangentis t valores." 20149: 15472:). Even for matrices whose elements are integers the calculation becomes nontrivial, because the sums are very long; the constant term is the 15605: 13039:

is 2, which is the smallest it could be for a matrix with two distinct eigenvalues. Geometric multiplicities are defined in a later section.

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in a soil sample, which can only be compared graphically such as in a Tri-Plot (Sneed and Folk) diagram, or as a Stereonet on a Wulff Net.

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of each eigenvalue is 2; in other words they are both double roots. The sum of the algebraic multiplicities of all distinct eigenvalues is

6973: 619: 22154:, pp. 807–808 Augustin Cauchy (1839) "Mémoire sur l'intégration des équations linéaires" (Memoir on the integration of linear equations), 21524:. Dip is measured as the eigenvalue, the modulus of the tensor: this is valued from 0° (no dip) to 90° (vertical). The relative values of 16047: 15820:{\displaystyle {\begin{bmatrix}4&1\\6&3\end{bmatrix}}{\begin{bmatrix}x\\y\end{bmatrix}}=6\cdot {\begin{bmatrix}x\\y\end{bmatrix}}} 10889:{\displaystyle A{\begin{bmatrix}5\\5\\5\end{bmatrix}}={\begin{bmatrix}5\\5\\5\end{bmatrix}}=1\cdot {\begin{bmatrix}5\\5\\5\end{bmatrix}}.} 4457: 23336:"On the definition and the computation of the basic reproduction ratio R0 in models for infectious diseases in heterogeneous populations" 22083:

In 1751, Leonhard Euler proved that any body has a principal axis of rotation: Leonhard Euler (presented: October 1751; published: 1760)

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One can generalize the algebraic object that is acting on the vector space, replacing a single operator acting on a vector space with an

7236: 862: 21320: 7305: 6094:{\displaystyle \operatorname {tr} (A)=\sum _{i=1}^{n}a_{ii}=\sum _{i=1}^{n}\lambda _{i}=\lambda _{1}+\lambda _{2}+\cdots +\lambda _{n}.} 2120: 1382: 19183: 19150:

direction and of 1 in the orthogonal direction. The vectors shown are unit eigenvectors of the (symmetric, positive-semidefinite)

13428: 5469:{\displaystyle {\begin{aligned}\gamma _{A}&=\sum _{i=1}^{d}\gamma _{A}(\lambda _{i}),\\d&\leq \gamma _{A}\leq n,\end{aligned}}} 2823: 13220:{\displaystyle |v_{i,j}|^{2}={\frac {\prod _{k}{(\lambda _{i}-\lambda _{k}(M_{j}))}}{\prod _{k\neq i}{(\lambda _{i}-\lambda _{k})}}},} 13055:

th component of a normalized eigenvector can be calculated using only the matrix eigenvalues and the eigenvalues of the corresponding

2007: 24332:

size (for a square matrix), then fill out the entries numerically and click on the Go button. It can accept complex numbers as well.)

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Graham, D.; Midgley, N. (2000), "Graphical representation of particle shape using triangular diagrams: an Excel spreadsheet method",

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scaled by the square root of the corresponding eigenvalue. Just as in the one-dimensional case, the square root is taken because the

14849: 16929: 16726: 16338:(optionally normalizing the vector to keep its elements of reasonable size); this makes the vector converge towards an eigenvector. 1164:. For some time, the standard term in English was "proper value", but the more distinctive term "eigenvalue" is the standard today. 24395: 24294: 24288: 21317:

The output for the orientation tensor is in the three orthogonal (perpendicular) axes of space. The three eigenvectors are ordered

20080: 12655:{\displaystyle A={\begin{bmatrix}2&0&0&0\\1&2&0&0\\0&1&3&0\\0&0&1&3\end{bmatrix}},} 5111: 4292: 21832:

is the average number of people that one typical infectious person will infect. The generation time of an infection is the time,

19769:) of vibration, and the eigenvectors are the shapes of these vibrational modes. In particular, undamped vibration is governed by 14346:

eigenvalues are always linearly independent. Therefore, the sum of the dimensions of the eigenspaces cannot exceed the dimension

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Report of the Thirty-second meeting of the British Association for the Advancement of Science; held at Cambridge in October 1862

24786: 23518: 23282: 20213: 6852: 6327: 25459: 23904:

Van Mieghem, Piet (18 January 2014). "Graph eigenvectors, fundamental weights and centrality metrics for nodes in networks".

23781: 23721: 23497: 23486: 20703: 17274: 13514: 5036: 24017: 23645:(2000), "Mathematical Handbook for Scientists and Engineers: Definitions, Theorems, and Formulas for Reference and Review", 15046: 6520:

and each eigenvalue's geometric multiplicity coincides. Moreover, since the characteristic polynomial of the inverse is the

4727:. This can be seen by evaluating what the left-hand side does to the first column basis vectors. By reorganizing and adding 2794:{\displaystyle \det(A-\lambda I)={\begin{vmatrix}2-\lambda &1\\1&2-\lambda \end{vmatrix}}=3-4\lambda +\lambda ^{2}.} 25200: 17173: 13698: 11557:{\displaystyle \mathbf {v} _{\lambda _{3}}={\begin{bmatrix}1&\lambda _{3}&\lambda _{2}\end{bmatrix}}^{\textsf {T}}} 11466:{\displaystyle \mathbf {v} _{\lambda _{2}}={\begin{bmatrix}1&\lambda _{2}&\lambda _{3}\end{bmatrix}}^{\textsf {T}}} 6754: 3055:

An important quantity associated with the spectrum is the maximum absolute value of any eigenvalue. This is known as the

1160:, which means "own", to denote eigenvalues and eigenvectors in 1904, though he may have been following a related usage by 23702: 22036: 21070: 21016: 9252:{\displaystyle \mathbf {v} _{\lambda =1}={\begin{bmatrix}v_{1}\\-v_{1}\end{bmatrix}}={\begin{bmatrix}1\\-1\end{bmatrix}}} 19022:

is not an integer multiple of 180°. Therefore, except for these special cases, the two eigenvalues are complex numbers,

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linear terms with some terms potentially repeating, the characteristic polynomial can also be written as the product of

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in terms of its once-lagged value, and taking the characteristic equation of this system's matrix. This equation gives

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which can be found by stacking into matrix form a set of equations consisting of the above difference equation and the

9670:{\displaystyle \mathbf {v} _{\lambda =3}={\begin{bmatrix}v_{1}\\v_{1}\end{bmatrix}}={\begin{bmatrix}1\\1\end{bmatrix}}} 7835:{\displaystyle Q={\begin{bmatrix}\mathbf {v} _{1}&\mathbf {v} _{2}&\cdots &\mathbf {v} _{n}\end{bmatrix}}.} 5791: 5218: 4684: 20: 24282: 19959: 19819: 17111: 25417: 24262: 24193: 24175: 23850: 23662: 23604: 23461: 23397: 23272: 23143: 23117: 21289: 19201:

of eigenvectors, each of which has a nonnegative eigenvalue. The orthogonal decomposition of a PSD matrix is used in

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The set of all eigenvectors of a linear transformation, each paired with its corresponding eigenvalue, is called the

524: 59: 15369:{\displaystyle {\frac {d^{k}x}{dt^{k}}}+a_{k-1}{\frac {d^{k-1}x}{dt^{k-1}}}+\cdots +a_{1}{\frac {dx}{dt}}+a_{0}x=0.} 8586:

The figure on the right shows the effect of this transformation on point coordinates in the plane. The eigenvectors

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Sneed, E. D.; Folk, R. L. (1958), "Pebbles in the lower Colorado River, Texas, a study of particle morphogenesis",

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Efficient, accurate methods to compute eigenvalues and eigenvectors of arbitrary matrices were not known until the

11001:{\displaystyle \lambda _{2}\lambda _{3}=1,\quad \lambda _{2}^{2}=\lambda _{3},\quad \lambda _{3}^{2}=\lambda _{2}.} 2324: 72: 21516:

is the tertiary, in terms of strength. The clast orientation is defined as the direction of the eigenvector, on a

17050:{\displaystyle {\begin{bmatrix}\cosh \varphi &\sinh \varphi \\\sinh \varphi &\cosh \varphi \end{bmatrix}}} 25295: 24738: 24674: 20496: 17859: 17655: 17363: 15464:. However, this approach is not viable in practice because the coefficients would be contaminated by unavoidable 4916: 1119:

studied eigenvalue problems similar to those of Sturm; the discipline that grew out of their work is now called

25393: 21379: 21232: 19954: 19758: 14531: 14506: 14475: 13632: 8515: 8164: 7674: 5291: 3110: 2539:{\displaystyle \det(A-\lambda I)=(\lambda _{1}-\lambda )(\lambda _{2}-\lambda )\cdots (\lambda _{n}-\lambda ),} 2401: 1420: 859:, then the eigenvalue equation for a linear transformation above can be rewritten as the matrix multiplication 681:

may be negative, in which case the eigenvector reverses direction as part of the scaling, or it may be zero or

590: 15468:, and the roots of a polynomial can be an extremely sensitive function of the coefficients (as exemplified by 25449: 24823: 22171:, le degré de cette équation étant précisément l'order de l'équation différentielle qu'il s'agit d'intégrer." 21714: 20428: 6916: 5920:

is the eigenvalue's algebraic multiplicity. The following are properties of this matrix and its eigenvalues:

4563: 18970: 12094:. As with diagonal matrices, the eigenvalues of triangular matrices are the elements of the main diagonal. 5880: 5837: 25405: 24388: 22129:. See: A. Cayley (1862) "Report on the progress of the solution of certain special problems of dynamics," 22051: 21961: 20375: 20326: 20143: 19732: 19233: 19213: 19194: 19190: 19173: 19167: 16918:{\displaystyle {\begin{bmatrix}\cos \theta &-\sin \theta \\\sin \theta &\cos \theta \end{bmatrix}}} 16610:

with the LU decomposition results in an algorithm with better convergence than the QR algorithm. For large

4756: 4527: 4350: 4061: 3772:). On the other hand, by definition, any nonzero vector that satisfies this condition is an eigenvector of 22092: 22084: 21661: 19743: 16394: 578: 25320: 24876: 24621: 24471: 23671:

Kublanovskaya, Vera N. (1962), "On some algorithms for the solution of the complete eigenvalue problem",

20874: 19574: 19367: 3171:

terms each corresponding to a distinct eigenvalue and raised to the power of the algebraic multiplicity,

2601:

As a brief example, which is described in more detail in the examples section later, consider the matrix

2266: 20932: 20768: 20665: 17231: 17068: 8115: 8060: 24891: 24526: 24420: 21608: 20593: 20244: 16607: 3030: 1121: 1004: 566: 535:

Eigenvalues and eigenvectors feature prominently in the analysis of linear transformations. The prefix

24232: 21490: 21461: 21432: 21267: 20871:, the infinite-dimensional analog of Hermitian matrices. As in the matrix case, in the equation above 16542: 13394: 6662: 5687: 5612: 5580: 3847: 733: 25439: 25305: 25277: 24914: 24766: 24415: 23561:, Wiley series in mathematical and computational biology, West Sussex, England: John Wiley & Sons 22358: 22118:, which proves that a body has three principal axes of rotation. He then states (on the same page): 21969: 21773: 21138: 21105: 20320: 19331: 19284: 15469: 14832:{\displaystyle \lambda ^{k}-a_{1}\lambda ^{k-1}-a_{2}\lambda ^{k-2}-\cdots -a_{k-1}\lambda -a_{k}=0,} 14497:

inverse. The spectrum of an operator always contains all its eigenvalues but is not limited to them.

14444: 10237:

The roots of the characteristic polynomial are 2, 1, and 11, which are the only three eigenvalues of

7599: 7570: 2371: 2216: 917:

Eigenvalues and eigenvectors give rise to many closely related mathematical concepts, and the prefix

24306:

from Symbolab (Click on the bottom right button of the 2×12 grid to select a matrix size. Select an

24087: 22659: 16346: 1062: 25350: 24758: 24641: 24244: 24240: 24224: 24144: 22191:

Nachrichten von der Gesellschaft der Wissenschaften zu Göttingen, Mathematisch-Physikalische Klasse

19727: 19701:

of the World Wide Web graph gives the page ranks as its components. This vector corresponds to the

19268: 19248: 19121: 18419: 18245: 15553: 14549: 8011: 7163: 6629: 5523: 4998: 369: 23164: 20994: 17335: 16575: 16426: 11657:. The eigenvalues of a diagonal matrix are the diagonal elements themselves. Consider the matrix 8399: 5264: 2815:. The eigenvectors corresponding to each eigenvalue can be found by solving for the components of 428: 394: 347: 298: 82: 25444: 25235: 25225: 25195: 25129: 24864: 24804: 24733: 24511: 24381: 22322: 22163: 21984:

purposes. Research related to eigen vision systems determining hand gestures has also been made.

20224: 20001: 19757:

Eigenvalue problems occur naturally in the vibration analysis of mechanical structures with many

19702: 19202: 8273: 6226:{\displaystyle \det(A)=\prod _{i=1}^{n}\lambda _{i}=\lambda _{1}\lambda _{2}\cdots \lambda _{n}.} 3761: 2594:, which may not all have distinct values, are roots of the polynomial and are the eigenvalues of 1052: 266: 20415: 19240:

by the principal components. Principal component analysis of the correlation matrix provides an

18083: 17909: 16189: 16140: 6944: 4645: 3751:{\displaystyle E=\left\{\mathbf {v} :\left(A-\lambda I\right)\mathbf {v} =\mathbf {0} \right\}.} 1167:

The first numerical algorithm for computing eigenvalues and eigenvectors appeared in 1929, when

25454: 25333: 25230: 25210: 25205: 25134: 24859: 24568: 24501: 24491: 24309: 22041: 20611: 20605: 20568: 20506: 19686: 16212:. A similar calculation shows that the corresponding eigenvectors are the nonzero solutions of 15479: 15433: 14512: 13505: 13056: 8289: 7386: 7184: 6728: 5925: 5765: 2342: 956: 513: 23920: 23692: 22288: 22138: 19642:

th principal eigenvector of a graph is defined as either the eigenvector corresponding to the

19516: 17483:{\displaystyle {\begin{aligned}\lambda _{1}&=k_{1}\\\lambda _{2}&=k_{2}\end{aligned}}} 16529:{\displaystyle \lambda ={\frac {\mathbf {v} ^{*}A\mathbf {v} }{\mathbf {v} ^{*}\mathbf {v} }}} 14385:, or equivalently if the direct sum of the eigenspaces associated with all the eigenvalues of 13292:. A widely used class of linear transformations acting on infinite-dimensional spaces are the 10718: 8389:{\displaystyle \mathbf {x} ^{\textsf {T}}H\mathbf {x} /\mathbf {x} ^{\textsf {T}}\mathbf {x} } 5091: 4013:. This can be checked by noting that multiplication of complex matrices by complex numbers is 196: 128: 25360: 25290: 25167: 25091: 25030: 25015: 25010: 24987: 24869: 24583: 24578: 24573: 24506: 24451: 24303: 22193:(News of the Philosophical Society at Göttingen, mathematical-physical section), pp. 49–91. 22103: 22001: 21228: 21217: 20868: 20500: 20220: 20028: 19296: 15620:

with known coefficients. For example, once it is known that 6 is an eigenvalue of the matrix

15193: 14524: 13321: 13293: 13263: 8181: 7456: 7346: 6521: 5192: 4887: 4858: 3953: 3881: 1982:{\displaystyle w_{i}=A_{i1}v_{1}+A_{i2}v_{2}+\cdots +A_{in}v_{n}=\sum _{j=1}^{n}A_{ij}v_{j}.} 1364: 1161: 1138: 1130: 1097: 1015: 1008: 989: 911: 727: 122: 19459: 16215: 13890:

which is the union of the zero vector with the set of all eigenvectors associated with

12179:{\displaystyle A={\begin{bmatrix}1&0&0\\1&2&0\\2&3&3\end{bmatrix}}.} 11739:{\displaystyle A={\begin{bmatrix}1&0&0\\0&2&0\\0&0&3\end{bmatrix}}.} 10510:{\displaystyle A={\begin{bmatrix}0&1&0\\0&0&1\\1&0&0\end{bmatrix}}.} 9818:{\displaystyle A={\begin{bmatrix}2&0&0\\0&3&4\\0&4&9\end{bmatrix}}.} 7532:{\displaystyle A^{\textsf {T}}\mathbf {u} ^{\textsf {T}}=\kappa \mathbf {u} ^{\textsf {T}}.} 6433: 4730: 3025:

The non-real roots of a real polynomial with real coefficients can be grouped into pairs of

25340: 25220: 25215: 25139: 25040: 24593: 24558: 24545: 24436: 24102: 23932: 23868: 23813: 23735: 23650: 23622: 23506: 23408: 23186: 23135: 23109: 22258: 22187:"Grundzüge einer allgemeinen Theorie der linearen Integralgleichungen. (Erste Mitteilung)" 22061: 22021: 21889: 21862: 21835: 21808: 21781: 21581: 21554: 21527: 21209: 21205: 21050: 20659: 20323:. They are associated with eigenvalues interpreted as their energies (increasing downward: 19489: 19089: 15684: 15385: 14520: 13614: 13509: 8442: 8050:

are linearly independent, Q is invertible. Right multiplying both sides of the equation by

6553: 6280: 5500:'s eigenvalues, or equivalently the maximum number of linearly independent eigenvectors of 4447:{\displaystyle {\boldsymbol {v}}_{1},\,\ldots ,\,{\boldsymbol {v}}_{\gamma _{A}(\lambda )}} 4014: 3048: 1200: 1044: 981: 907: 674: 517: 422: 223:

quantities with magnitude and direction, often pictured as arrows. A linear transformation

16018: 15430:

can be determined by finding the roots of the characteristic polynomial. This is easy for

8189:

is the change of basis matrix of the similarity transformation. Essentially, the matrices

7057: 4560:

columns are these eigenvectors, and whose remaining columns can be any orthonormal set of

4051:, or equivalently the maximum number of linearly independent eigenvectors associated with 3056: 8: 25355: 25265: 25187: 25086: 25020: 24977: 24967: 24947: 24771: 24651: 24626: 24476: 23474: 23130:

A First Course In Linear Algebra: with Optional Introduction to Groups, Rings, and Fields

22262: 20284: 19711: 19337: 16672: 16662: 16569: 14561: 14516: 14471: 8310:

case, eigenvalues can be given a variational characterization. The largest eigenvalue of

6806: 6548: 3131: 1368: 224: 24106: 23936: 23872: 23817: 23791: 23654: 23626: 23510: 23190: 22644: 19263:, the eigenvalues of the correlation matrix determine the Q-methodologist's judgment of 19232:

equal to one). For the covariance or correlation matrix, the eigenvectors correspond to

15505: 320: 25381: 25300: 25240: 25172: 25162: 25101: 25076: 24952: 24909: 24904: 24481: 24368: 23964: 23905: 23884: 23829: 23803: 23522: 23373: 23315: 23297: 23218: 23176: 23128: 22268: 22215:

For the origin and evolution of the terms eigenvalue, characteristic value, etc., see:

22031: 21965: 21236: 20912: 20847: 20827: 20807: 20638: 20537: 20478: 20397: 20276: 20056: 19932: 19908: 19888: 19865: 19665: 19645: 19625: 19554: 19439: 19309: 19272: 19237: 19225: 19155: 18961: 16654: 16448: 16306: 16169: 16120: 16100: 15914:{\displaystyle \left\{{\begin{aligned}4x+y&=6x\\6x+3y&=6y\end{aligned}}\right.} 15583: 15559: 15535: 15529: 15413: 14366: 13230: 10693: 10426: 8313: 8285: 8277: 7648: 7628: 7550: 7436: 7412: 7366: 7285: 7210: 7037: 6832: 6708: 6638: 6611: 6580: 6530: 6413: 6386: 6307: 6260: 6240: 6112: 5931: 5745: 5716: 5661: 5641: 5560: 5503: 5483: 5334: 5172: 4978: 4838: 4818: 4625: 4605: 4507: 3785: 3641: 1184: 1180: 1081: 228: 104: 24276: 24115: 23634: 21950:. The dimension of this vector space is the number of pixels. The eigenvectors of the 16006:{\displaystyle \left\{{\begin{aligned}-2x+y&=0\\6x-3y&=0\end{aligned}}\right.} 11578:, respectively. The two complex eigenvectors also appear in a complex conjugate pair, 25376: 25096: 25081: 25025: 24972: 24679: 24636: 24563: 24456: 24360: 24189: 24171: 23956: 23948: 23888: 23846: 23833: 23777: 23759: 23739: 23717: 23698: 23684: 23658: 23600: 23582: 23547: 23526: 23482: 23457: 23393: 23365: 23319: 23268: 23261: 23248: 23244: 23222: 23210: 23202: 23139: 23113: 23022: 22046: 21951: 21221: 21197: 21185: 21177: 20984: 20419: 20046: 19762: 19221: 19209: 19151: 16618: 16339: 12086: 11653: 8168: 6404: 5477: 3663: 3026: 3003: 1168: 1149: 1085: 244: 19:"Characteristic root" redirects here. For the root of a characteristic equation, see 23968: 23377: 18512:{\displaystyle {\begin{aligned}\gamma _{1}&=1\\\gamma _{2}&=1\end{aligned}}} 18408:{\displaystyle {\begin{aligned}\gamma _{1}&=1\\\gamma _{2}&=1\end{aligned}}} 18338:{\displaystyle {\begin{aligned}\gamma _{1}&=1\\\gamma _{2}&=1\end{aligned}}} 12907:

of the eigenvalue 2 is only 1, because its eigenspace is spanned by just one vector

3394:). The size of each eigenvalue's algebraic multiplicity is related to the dimension 1134: 701: 25310: 25285: 25157: 25005: 24942: 24684: 24588: 24441: 24153: 24120: 24110: 24063: 23940: 23876: 23821: 23680: 23630: 23542: 23514: 23439: 23417: 23355: 23347: 23307: 23198: 23194: 22085:"Du mouvement d'un corps solide quelconque lorsqu'il tourne autour d'un axe mobile" 21977: 21939: 21189: 20371: 20074: 19950: 19698: 19327: 19304: 19241: 19198: 19187: 16622: 16611: 15601: 15577: 14545: 14494: 13881:{\displaystyle E=\left\{\mathbf {v} :T(\mathbf {v} )=\lambda \mathbf {v} \right\},} 13048: 8307: 8269: 6602: 6598: 5948:, defined as the sum of its diagonal elements, is also the sum of all eigenvalues, 3019: 1196: 1116: 1109: 1105: 1101: 1074: 1066: 1032: 574: 556: 216: 181:. It is often important to know these vectors in linear algebra. The corresponding 39: 24132: 22106:

proved that any body has three principal axes of rotation: Johann Andreas Segner,

12090:, while a matrix whose elements below the main diagonal are all zero is called an 8288:

and therefore admits a basis of generalized eigenvectors and a decomposition into

936:

corresponding to the same eigenvalue, together with the zero vector, is called an

723:

eigenvalue equal to one, because the mapping does not change their length either.

25250: 25177: 25106: 24899: 24743: 24536: 24496: 24486: 23977: 23825: 23642: 23281:

Denton, Peter B.; Parke, Stephen J.; Tao, Terence; Zhang, Xining (January 2022).

22668: 22422: 22189:(Fundamentals of a general theory of linear integral equations. (First report)), 21521: 20272: 20053:

are different from the principal compliance modes, which are the eigenvectors of

19280: 19276: 19229: 19217: 19206: 19177: 19067: 16332: 15830: 15465: 14422: 13607: 10762:= 1, any vector with three equal nonzero entries is an eigenvector. For example, 8301: 4347:, consider how the definition of geometric multiplicity implies the existence of 3837: 3011: 2200: 1153: 1126: 1070: 1019: 573:, eigenvalues and eigenvectors have a wide range of applications, for example in 542: 24355: 23165:"Fluctuations and Correlations of Transmission Eigenchannels in Diffusive Media" 20259:

is a key quantity required to determine the rotation of a rigid body around its

12963:{\displaystyle {\begin{bmatrix}0&1&-1&1\end{bmatrix}}^{\textsf {T}}} 8452: 7596:, with the same eigenvalue. Furthermore, since the characteristic polynomial of 25328: 25255: 24962: 24748: 24669: 24404: 23845:, Translated and edited by Richard A. Silverman, New York: Dover Publications, 23751: 23389: 23283:"Eigenvectors from Eigenvalues: A Survey of a Basic Identity in Linear Algebra" 22056: 22026: 21193: 21181: 20601: 20383: 20260: 20240: 20050: 19256: 19066:

A linear transformation that takes a square to a rectangle of the same area (a

15399: 13297: 13023:{\displaystyle {\begin{bmatrix}0&0&0&1\end{bmatrix}}^{\textsf {T}}} 10711: 8331: 6656: 4383: 3022:, which include the rationals, the eigenvalues must also be algebraic numbers. 2231: 1093: 1040: 996: 985: 977: 682: 582: 29: 24068: 24051: 23556: 23163:

Bender, Nicholas; Yamilov, Alexey; Yilmaz, Hasan; Cao, Hui (14 October 2020).

22674: 22440: 18176:{\displaystyle {\begin{aligned}\mu _{1}&=1\\\mu _{2}&=1\end{aligned}}} 18072:{\displaystyle {\begin{aligned}\mu _{1}&=1\\\mu _{2}&=1\end{aligned}}} 18002:{\displaystyle {\begin{aligned}\mu _{1}&=1\\\mu _{2}&=1\end{aligned}}} 12662:

has a characteristic polynomial that is the product of its diagonal elements,

25433: 25116: 25048: 25000: 24781: 24704: 24664: 24631: 24611: 23952: 23470: 23444: 23422: 23206: 22126: 22006: 21201: 20976: 20909:

is understood to be the vector obtained by application of the transformation

20597: 20316: 20312: 19260: 16667: 16614: 15617: 15032:{\displaystyle {\begin{bmatrix}x_{t}&\cdots &x_{t-k+1}\end{bmatrix}}} 13587: 13285: 13284:

remains valid even if the underlying vector space is an infinite-dimensional

13275: 7738: 2421: 1145: 1048: 1011:

realized that the principal axes are the eigenvectors of the inertia matrix.

765: 715: 693: 688: 547: 502: 232: 21942:, processed images of faces can be seen as vectors whose components are the 16625:

to compute eigenvalues and eigenvectors, among several other possibilities.

15456:

matrices, but the difficulty increases rapidly with the size of the matrix.

11637:{\displaystyle \mathbf {v} _{\lambda _{2}}=\mathbf {v} _{\lambda _{3}}^{*}.} 10420: 3960:

is a linear subspace, it is closed under scalar multiplication. That is, if

25058: 25053: 24957: 24714: 24603: 24553: 24446: 24364: 23960: 23214: 22087:(On the movement of any solid body while it rotates around a moving axis), 22016: 21517: 21307: 20531: 20414:

is represented in terms of a differential operator is the time-independent

20300: 19723: 19706: 19300: 19279:). More generally, principal component analysis can be used as a method of 18965: 16603: 14377:

to such a subspace is diagonalizable. Moreover, if the entire vector space

13598:

The concept of eigenvalues and eigenvectors extends naturally to arbitrary

13289: 13269: 12313:. These roots are the diagonal elements as well as the eigenvalues of 11873:. These roots are the diagonal elements as well as the eigenvalues of 7991:

With this in mind, define a diagonal matrix Λ where each diagonal element Λ

4203:{\displaystyle \gamma _{A}(\lambda )=n-\operatorname {rank} (A-\lambda I).} 1372: 1176: 1172: 1152:

by viewing the operators as infinite matrices. He was the first to use the

847:

by 1 matrices. If the linear transformation is expressed in the form of an

252: 24815: 24037: 23567: 23369: 23045: 22089:

Histoire de l'Académie royale des sciences et des belles lettres de Berlin

20227:, but neatly generalize the solution to scalar-valued vibration problems. 20219:

The orthogonality properties of the eigenvectors allows decoupling of the

16390:

this causes it to converge to an eigenvector of the eigenvalue closest to

15182:{\displaystyle x_{t}=c_{1}\lambda _{1}^{t}+\cdots +c_{k}\lambda _{k}^{t}.} 13810: 13280:

The definitions of eigenvalue and eigenvectors of a linear transformation

13262:

th row and column from the original matrix. This identity also extends to

12879:

The roots of this polynomial, and hence the eigenvalues, are 2 and 3. The

10350:{\displaystyle {\begin{bmatrix}0&-2&1\end{bmatrix}}^{\textsf {T}}} 1022:, and generalized it to arbitrary dimensions. Cauchy also coined the term 561: 25260: 24924: 24847: 24694: 24659: 24616: 24461: 24298: 24140: 23944: 23792:"Light fields in complex media: Mesoscopic scattering meets wave control" 20562: 20304: 19953:. Admissible solutions are then a linear combination of solutions to the 19926: 15473: 12083:

A matrix whose elements above the main diagonal are all zero is called a

10408:{\displaystyle {\begin{bmatrix}0&1&2\end{bmatrix}}^{\textsf {T}}} 10290:{\displaystyle {\begin{bmatrix}1&0&0\end{bmatrix}}^{\textsf {T}}} 6106: 3034: 2354: 2235: 1089: 24337: 23311: 22966: 6513:{\textstyle {\frac {1}{\lambda _{1}}},\ldots ,{\frac {1}{\lambda _{n}}}} 4280:{\displaystyle 1\leq \gamma _{A}(\lambda )\leq \mu _{A}(\lambda )\leq n} 537: 455:

is the corresponding eigenvalue. This relationship can be expressed as:

25245: 25124: 24919: 24723: 24466: 23716:, Philadelphia: Society for Industrial and Applied Mathematics (SIAM), 23351: 22111: 22011: 21973: 21954:

associated with a large set of normalized pictures of faces are called

21943: 21225: 20865: 20248: 16683: 14339: 13599: 13309: 12274:{\displaystyle \det(A-\lambda I)=(1-\lambda )(2-\lambda )(3-\lambda ),} 11834:{\displaystyle \det(A-\lambda I)=(1-\lambda )(2-\lambda )(3-\lambda ),} 6524:

of the original, the eigenvalues share the same algebraic multiplicity.

2334: 1000: 906:

by 1 matrix. For a matrix, eigenvalues and eigenvectors can be used to

570: 76: 23519:

10.1002/1096-9837(200012)25:13<1473::AID-ESP158>3.0.CO;2-C

23069: 22853: 20287:

components; the components it does have are the principal components.

16837:{\displaystyle {\begin{bmatrix}k_{1}&0\\0&k_{2}\end{bmatrix}}} 14967:-dimensional system of the first order in the stacked variable vector 13492:

This differential equation can be solved by multiplying both sides by

2874:

In this example, the eigenvectors are any nonzero scalar multiples of

1209: 616:, called an eigenvalue. This condition can be written as the equation 523:

The following section gives a more general viewpoint that also covers

24521: 24124: 23452:

Friedberg, Stephen H.; Insel, Arnold J.; Spence, Lawrence E. (1989),

23360: 21956: 21933: 21925: 21213: 20980: 20236: 19752: 19078: 16296:{\displaystyle {\begin{bmatrix}b&-3b\end{bmatrix}}^{\textsf {T}}} 14683:{\displaystyle x_{t}=a_{1}x_{t-1}+a_{2}x_{t-2}+\cdots +a_{k}x_{t-k}.} 13255: 8887:

Setting the characteristic polynomial equal to zero, it has roots at

7473:

is its associated eigenvalue. Taking the transpose of this equation,

7027:{\displaystyle \{\lambda _{1}+\alpha ,\ldots ,\lambda _{k}+\alpha \}} 2803:

Setting the characteristic polynomial equal to zero, it has roots at

711: 586: 506: 220: 24295:

Eigenvectors and eigenvalues | Essence of linear algebra, chapter 10

23093: 22732: 22730: 22216: 22095:, Euler proves that any body contains a principal axis of rotation: 16090:{\displaystyle {\begin{bmatrix}a&2a\end{bmatrix}}^{\textsf {T}}} 8272:. For defective matrices, the notion of eigenvectors generalizes to 4497:{\displaystyle A{\boldsymbol {v}}_{k}=\lambda {\boldsymbol {v}}_{k}} 3642:

Eigenspaces, geometric multiplicity, and the eigenbasis for matrices

25149: 25068: 24995: 24689: 24243:

external links, and converting useful links where appropriate into

23880: 23808: 23302: 23181: 23002: 22841: 20308: 20280: 19862:

That is, acceleration is proportional to position (i.e., we expect

19694: 19252: 19159: 18825:{\displaystyle \mathbf {u} _{1}={\begin{bmatrix}1\\0\end{bmatrix}}} 15608:

for the roots of a degree 3 polynomial is numerically impractical.

15461: 14275:

is closed under addition and scalar multiplication. The eigenspace

835:

Alternatively, the linear transformation could take the form of an

828:{\displaystyle {\frac {d}{dx}}e^{\lambda x}=\lambda e^{\lambda x}.} 612:

to the eigenvector only scales the eigenvector by the scalar value

248: 24279:– non-technical introduction from PhysLink.com's "Ask the Experts" 23921:"Focusing coherent light through opaque strongly scattering media" 23910: 23533:

Hawkins, T. (1975), "Cauchy and the spectral theory of matrices",

22978: 22939: 22807: 22805: 21369:{\displaystyle \mathbf {v} _{1},\mathbf {v} _{2},\mathbf {v} _{3}} 16713: 16690: 12896:, the order of the characteristic polynomial and the dimension of 2165:{\displaystyle \left(A-\lambda I\right)\mathbf {v} =\mathbf {0} ,} 565:) for 'proper', 'characteristic', 'own'. Originally used to study 24934: 24373: 22727: 21303: 20256: 14500: 8577:{\displaystyle A={\begin{bmatrix}2&1\\1&2\end{bmatrix}}.} 2865:{\displaystyle \left(A-\lambda I\right)\mathbf {v} =\mathbf {0} } 2656:{\displaystyle A={\begin{bmatrix}2&1\\1&2\end{bmatrix}}.} 552: 240: 23749: 23743: 23430:

Francis, J. G. F. (1962), "The QR Transformation, II (part 2)",

22680: 22446: 20295: 15672:{\displaystyle A={\begin{bmatrix}4&1\\6&3\end{bmatrix}}} 2210: 2044:{\displaystyle A\mathbf {v} =\mathbf {w} =\lambda \mathbf {v} ,} 24699: 23481:(3rd ed.), Baltimore, MD: Johns Hopkins University Press, 23406:

Francis, J. G. F. (1961), "The QR Transformation, I (part 1)",

23252: 23158:, Free online book under GNU licence, University of Puget Sound 23057: 22956: 22954: 22802: 22705: 22703: 22701: 22531: 22529: 22452: 22125:

The relevant passage of Segner's work was discussed briefly by

21311: 20555: 20534:, is one of its eigenfunctions corresponding to the eigenvalue 20387: 20252: 19690: 14956:{\displaystyle x_{t-1}=x_{t-1},\ \dots ,\ x_{t-k+1}=x_{t-k+1},} 14542:

are the analogs of eigenvectors and eigenspaces, respectively.

8431: 7274:

The eigenvalue and eigenvector problem can also be defined for

3113:

of the characteristic polynomial, that is, the largest integer

22896: 22375: 22373: 21913:

is then the largest eigenvalue of the next generation matrix.

20394:

An example of an eigenvalue equation where the transformation

16972:{\displaystyle {\begin{bmatrix}1&k\\0&1\end{bmatrix}}} 16769:{\displaystyle {\begin{bmatrix}k&0\\0&k\end{bmatrix}}} 14287:. If that subspace has dimension 1, it is sometimes called an 11651:

Matrices with entries only along the main diagonal are called

4681:, we get a matrix whose top left block is the diagonal matrix 1133:

on general domains towards the end of the 19th century, while

51: 24052:"Eigenvector components of symmetric, graph-related matrices" 23776:(3rd ed.), New York: Springer Science + Business Media, 23335: 22613: 21947: 21921: 20972: 14331:) ≥ 1 because every eigenvalue has at least one eigenvector. 13375:

The functions that satisfy this equation are eigenvectors of

7668: 3014:

or even if they are all integers. However, if the entries of

23033: 22990: 22951: 22698: 22553: 22541: 22526: 19747:

Mode shape of a tuning fork at eigenfrequency 440.09 Hz

12528:

respectively, as well as scalar multiples of these vectors.

12075:

respectively, as well as scalar multiples of these vectors.

8611:

Taking the determinant to find characteristic polynomial of

5159:{\displaystyle \mu _{A}(\lambda )\geq \gamma _{A}(\lambda )} 4340:{\displaystyle \gamma _{A}(\lambda )\leq \mu _{A}(\lambda )} 2571:

may be real but in general is a complex number. The numbers

23094:"Eigenvalue, eigenfunction, eigenvector, and related terms" 22929: 22927: 22925: 22923: 22370: 22217:

Earliest Known Uses of Some of the Words of Mathematics (E)

20212:

This can be reduced to a generalized eigenvalue problem by

16697: 16000: 15908: 12531: 7146:{\displaystyle \{P(\lambda _{1}),\ldots ,P(\lambda _{k})\}} 3836:

by 1 matrices. A property of the nullspace is that it is a

1190: 45: 24035: 23153: 23075: 22908: 22589: 22338: 21964:. They are very useful for expressing any face image as a 21224:, one often represents the Hartree–Fock equation in a non- 13266:, and has been rediscovered many times in the literature. 8276:

and the diagonal matrix of eigenvalues generalizes to the

8237:

whose eigenvalue is the corresponding diagonal element of

5713:

can be written as a linear combination of eigenvectors of

4213:

that an eigenvalue's algebraic multiplicity cannot exceed

22754: 22715: 22601: 20561:

However, in the case where one is interested only in the

10898:

For the complex conjugate pair of imaginary eigenvalues,

10421:

Three-dimensional matrix example with complex eigenvalues

6906:{\displaystyle \{\lambda _{1}+1,\ldots ,\lambda _{k}+1\}} 6601:, then every eigenvalue is real. The same is true of any 6373:{\displaystyle \lambda _{1}^{k},\ldots ,\lambda _{n}^{k}} 48: 22920: 22504: 22502: 22500: 22498: 22114:

p. xxviiii ), Segner derives a third-degree equation in

21605:

are dictated by the nature of the sediment's fabric. If

20203:{\displaystyle \left(\omega ^{2}m+\omega c+k\right)x=0.} 16704: 14401:

can be formed from linearly independent eigenvectors of

13270:

Eigenvalues and eigenfunctions of differential operators

12536:

As in the previous example, the lower triangular matrix

23673:

USSR Computational Mathematics and Mathematical Physics

23333: 23098:

Earliest Known Uses of Some of the Words of Mathematics

23051: 22829: 22817: 22766: 22742: 22686: 22565: 22514: 22473: 22471: 22469: 22467: 20755:{\displaystyle H|\Psi _{E}\rangle =E|\Psi _{E}\rangle } 17321:{\displaystyle \lambda ^{2}-2\cosh(\varphi )\lambda +1} 16465:, then the corresponding eigenvalue can be computed as 15532:

for the roots of a polynomial exist only if the degree

13811:

Eigenspaces, geometric multiplicity, and the eigenbasis

7567:

is the same as the transpose of a right eigenvector of

5737: 5081:{\displaystyle (\xi -\lambda )^{\gamma _{A}(\lambda )}} 3788:

of the zero vector with the set of all eigenvectors of

768:

that are scaled by that differential operator, such as

24018:"Neutrinos Lead to Unexpected Discovery in Basic Math" 23162: 22972: 22390: 22388: 19577: 18917: 18868: 18801: 18735: 18683: 18612: 18563: 16992: 16938: 16857: 16789: 16735: 16260: 16057: 15796: 15761: 15725: 15638: 15087:{\displaystyle \lambda _{1},\,\ldots ,\,\lambda _{k},} 14979: 13399: 13233: 12983: 12920: 12698: 12554: 12485: 12423: 12354: 12115: 12032: 11973: 11914: 11675: 11508: 11417: 11321: 11258: 11208: 11138: 11075: 11025: 10855: 10813: 10777: 10446: 10373: 10312: 10255: 10020: 9949: 9880: 9754: 9646: 9603: 9427: 9384: 9342: 9225: 9179: 9048: 9005: 8969: 8750: 8706: 8664: 8540: 8494:

preserves the direction of purple vectors parallel to

7889: 7773: 6466: 4642:

has full rank and is therefore invertible. Evaluating

2961: 2907: 2717: 2619: 1762: 1698: 1520: 1314: 1294: 1261: 764:, in which case the eigenvectors are functions called 738: 608:

is applied to it, does not change direction. Applying

24312: 23754:; Vetterling, William T.; Flannery, Brian P. (2007), 23456:(2nd ed.), Englewood Cliffs, NJ: Prentice Hall, 22790: 22778: 22625: 22495: 22483: 22400: 22291: 22271: 21892: 21865: 21838: 21811: 21784: 21717: 21664: 21611: 21584: 21557: 21530: 21493: 21464: 21435: 21382: 21323: 21141: 21108: 21073: 21053: 21019: 20997: 20935: 20915: 20877: 20850: 20830: 20810: 20771: 20706: 20668: 20641: 20614: 20571: 20565:

solutions of the Schrödinger equation, one looks for

20540: 20509: 20481: 20431: 20400: 20329: 20152: 20083: 20059: 20031: 20004: 19962: 19935: 19911: 19891: 19868: 19822: 19775: 19668: 19648: 19628: 19557: 19519: 19492: 19462: 19442: 19370: 19340: 19312: 19124: 19092: 19028: 18973: 18839: 18780: 18654: 18534: 18456: 18422: 18352: 18282: 18248: 18198: 18120: 18086: 18016: 17946: 17912: 17862: 17705: 17658: 17497: 17413: 17366: 17338: 17277: 17234: 17220:{\displaystyle \lambda ^{2}-2\cos(\theta )\lambda +1} 17176: 17114: 17071: 16986: 16932: 16851: 16783: 16729: 16578: 16545: 16474: 16451: 16429: 16397: 16349: 16309: 16253: 16218: 16192: 16172: 16143: 16123: 16103: 16050: 16021: 15933: 15838: 15719: 15687: 15681:

we can find its eigenvectors by solving the equation

15626: 15586: 15562: 15538: 15508: 15482: 15436: 15416: 15205: 15103: 15049: 14973: 14852: 14710: 14573: 14109: 13923: 13825: 13733:{\displaystyle T(\mathbf {v} )=\lambda \mathbf {v} .} 13701: 13635: 13517: 13431: 13397: 13329: 13065: 12976: 12913: 12668: 12542: 12326: 12198: 12103: 11886: 11758: 11663: 11584: 11479: 11388: 11199: 11016: 10904: 10768: 10721: 10696: 10529: 10434: 10366: 10305: 10248: 9837: 9742: 9576: 9289: 9152: 9084: 8927: 8621: 8528: 8445: 8402: 8339: 8316: 8118: 8063: 8014: 7874: 7761: 7651: 7631: 7602: 7573: 7553: 7547:), it follows immediately that a left eigenvector of 7479: 7459: 7439: 7415: 7389: 7369: 7349: 7308: 7288: 7239: 7213: 7187: 7089: 7060: 7040: 6976: 6947: 6919: 6855: 6835: 6809: 6796:{\displaystyle \{\lambda _{1},\ldots ,\lambda _{k}\}} 6757: 6731: 6711: 6665: 6641: 6614: 6583: 6556: 6533: 6436: 6416: 6389: 6330: 6310: 6283: 6263: 6243: 6137: 6115: 5956: 5934: 5883: 5840: 5794: 5768: 5748: 5719: 5690: 5664: 5644: 5615: 5583: 5563: 5526: 5506: 5486: 5357: 5337: 5294: 5267: 5221: 5195: 5175: 5114: 5094: 5039: 5001: 4981: 4919: 4890: 4861: 4841: 4821: 4759: 4733: 4687: 4648: 4628: 4608: 4566: 4530: 4510: 4460: 4392: 4353: 4295: 4223: 4144: 4064: 3850: 3832:

is a complex number and the eigenvectors are complex

3685: 3404: 3177: 2880: 2826: 2687: 2607: 2439: 2269: 2123: 2010: 1834: 1514: 1478: 1423: 1385: 1247: 865: 774: 736: 654:{\displaystyle T(\mathbf {v} )=\lambda \mathbf {v} ,} 622: 461: 431: 397: 372: 350: 323: 301: 269: 199: 151: 131: 107: 85: 60: 24039:

Estimation of 3D motion and structure of human faces

23975: 23612: 23451: 23267:(5th ed.), Boston: Prindle, Weber and Schmidt, 23008: 22859: 22643:

Cornell University Department of Mathematics (2016)

22464: 22458: 20279:

tensor is symmetric and so can be decomposed into a

16015:

Both equations reduce to the single linear equation

14548:

is a tensor-multiple of itself and is considered in

13756:

This equation is called the eigenvalue equation for

6803:

are its eigenvalues, then the eigenvalues of matrix

984:. Historically, however, they arose in the study of 24341:Wikiversity uses introductory physics to introduce 24036:Xirouhakis, A.; Votsis, G.; Delopoulus, A. (2004), 23691:Lipschutz, Seymour; Lipson, Marc (12 August 2002). 23572:, Colchester, VT: Online book, St Michael's College 23554: 23280: 23232:

A Practical Guide to the study of Glacial Sediments

23063: 22811: 22577: 22385: 22357:Gilbert Strang. "6: Eigenvalues and Eigenvectors". 21262:

may be too technical for most readers to understand

21204:. The corresponding eigenvalues are interpreted as 21094:{\displaystyle \mathbf {t} ^{\dagger }\mathbf {t} } 21040:{\displaystyle \mathbf {t} ^{\dagger }\mathbf {t} } 19714:. Other methods are also available for clustering. 19697:algorithm. The principal eigenvector of a modified 19247:Principal component analysis is used as a means of 14314:is the dimension of the eigenspace associated with 10241:. These eigenvalues correspond to the eigenvectors 9731: 7265:{\displaystyle A\mathbf {v} =\lambda \mathbf {v} .} 976:Eigenvalues are often introduced in the context of 891:{\displaystyle A\mathbf {v} =\lambda \mathbf {v} ,} 145:, when the linear transformation is applied to it: 42: 24324: 24085: 23756:Numerical Recipes: The Art of Scientific Computing 23260: 23127: 23126:Beauregard, Raymond A.; Fraleigh, John B. (1973), 23125: 22736: 22637: 22313: 22277: 21905: 21878: 21851: 21824: 21797: 21756: 21703: 21650: 21597: 21570: 21543: 21508: 21479: 21450: 21421: 21368: 21160: 21127: 21093: 21059: 21039: 21005: 20956: 20921: 20901: 20856: 20836: 20816: 20792: 20754: 20689: 20647: 20627: 20584: 20546: 20522: 20487: 20464: 20406: 20362: 20202: 20134: 20065: 20037: 20017: 19990: 19941: 19917: 19897: 19874: 19852: 19808: 19674: 19654: 19634: 19614: 19563: 19543: 19505: 19478: 19448: 19424: 19352: 19318: 19142: 19110: 19055: 19010: 18947: 18824: 18765: 18639: 18511: 18441: 18407: 18337: 18267: 18233: 18175: 18105: 18071: 18001: 17931: 17897: 17839: 17690: 17643: 17482: 17398: 17351: 17320: 17262: 17219: 17161: 17099: 17049: 16971: 16917: 16836: 16768: 16586: 16560: 16528: 16457: 16437: 16411: 16380: 16315: 16295: 16239: 16204: 16178: 16155: 16129: 16109: 16089: 16036: 16005: 15913: 15819: 15705: 15671: 15592: 15568: 15544: 15517: 15494: 15448: 15422: 15368: 15181: 15086: 15031: 14955: 14831: 14682: 14222: 14045: 13880: 13732: 13656: 13563: 13482: 13417: 13365: 13246: 13219: 13042: 13022: 12962: 12869: 12654: 12518: 12320:These eigenvalues correspond to the eigenvectors, 12273: 12178: 12065: 11833: 11738: 11636: 11556: 11465: 11368: 11185: 11000: 10888: 10743: 10702: 10682: 10509: 10407: 10349: 10289: 10227: 9817: 9669: 9546: 9251: 9122: 9071: 8877: 8576: 8486: 8410: 8388: 8322: 8268:A matrix that is not diagonalizable is said to be 8149: 8094: 8035: 7980: 7834: 7657: 7637: 7617: 7588: 7559: 7531: 7465: 7445: 7421: 7401: 7375: 7355: 7334:{\displaystyle \mathbf {u} A=\kappa \mathbf {u} ,} 7333: 7294: 7264: 7219: 7199: 7145: 7075: 7046: 7026: 6962: 6933: 6905: 6841: 6821: 6795: 6743: 6717: 6694: 6647: 6620: 6589: 6569: 6539: 6512: 6452: 6422: 6395: 6372: 6316: 6296: 6269: 6249: 6225: 6121: 6093: 5940: 5912: 5869: 5826: 5780: 5754: 5725: 5705: 5670: 5650: 5630: 5598: 5569: 5545: 5512: 5492: 5468: 5343: 5323: 5280: 5253: 5207: 5181: 5158: 5100: 5080: 5025: 4987: 4967: 4905: 4876: 4847: 4827: 4807: 4745: 4719: 4673: 4634: 4614: 4594: 4552: 4516: 4496: 4446: 4375: 4339: 4279: 4202: 4086: 3865: 3750: 3539: 3366: 3033:at least one of the roots is real. Therefore, any 2987: 2864: 2793: 2655: 2538: 2299: 2164: 2043: 1981: 1820: 1500: 1445: 1408:{\displaystyle \mathbf {x} =\lambda \mathbf {y} .} 1407: 1353: 1237:-dimensional vectors that are formed as a list of 890: 827: 756: 653: 484:{\displaystyle A\mathbf {v} =\lambda \mathbf {v} } 483: 439: 405: 383: 358: 332: 309: 283: 205: 174:{\displaystyle T\mathbf {v} =\lambda \mathbf {v} } 173: 137: 113: 93: 24285:– Tutorial and Interactive Program from Revoledu. 24283:Eigen Values and Eigen Vectors Numerical Examples 24227:may not follow Knowledge's policies or guidelines 23597:Mathematical thought from ancient to modern times 20697:. In this notation, the Schrödinger equation is: 19726:is represented by a matrix whose entries are the 19685:The principal eigenvector is used to measure the 19212:are PSD. This orthogonal decomposition is called 18234:{\displaystyle \gamma _{i}=\gamma (\lambda _{i})} 13483:{\displaystyle {\frac {d}{dt}}f(t)=\lambda f(t).} 8426: 8280:. Over an algebraically closed field, any matrix 7737:. The eigenvalues need not be distinct. Define a 5827:{\displaystyle \lambda _{1},\ldots ,\lambda _{n}} 5254:{\displaystyle \lambda _{1},\ldots ,\lambda _{d}} 5088:, which means that the algebraic multiplicity of 4720:{\displaystyle \lambda I_{\gamma _{A}(\lambda )}} 2404:implies that the characteristic polynomial of an 1018:saw how their work could be used to classify the 25431: 24095:Journal of Computational and Applied Mathematics 23919:Vellekoop, I. M.; Mosk, A. P. (15 August 2007). 23558:Mathematical epidemiology of infectious diseases 22652: 22110:( Halle ("Halae"), (Germany): Gebauer, 1755). ( 21147: 21114: 21013:. The eigenvectors of the transmission operator 18960:The characteristic equation for a rotation is a 17162:{\displaystyle (\lambda -k_{1})(\lambda -k_{2})} 12669: 12199: 11759: 9842: 8626: 7625:is the same as the characteristic polynomial of 7302:. In this formulation, the defining equation is 6138: 5002: 4944: 4920: 3178: 2688: 2440: 2270: 24086:Golub, Gene F.; van der Vorst, Henk A. (2000), 23790:Rotter, Stefan; Gigan, Sylvain (2 March 2017). 23690: 23334:Diekmann, O; Heesterbeek, JA; Metz, JA (1990), 23259:Burden, Richard L.; Faires, J. Douglas (1993), 22902: 22646:Lower-Level Courses for Freshmen and Sophomores 19073: 16445:is (a good approximation of) an eigenvector of 13784:) is the result of applying the transformation 13304:be a linear differential operator on the space 9687:= 3, as is any scalar multiple of this vector. 9267:= 1, as is any scalar multiple of this vector. 8516:An extended version, showing all four quadrants 8295: 4130:), which relates to the dimension and rank of ( 3388:linear terms and this is the same as equation ( 1241:scalars, such as the three-dimensional vectors 24289:Introduction to Eigen Vectors and Eigen Values 21458:then is the primary orientation/dip of clast, 20230: 19277:criteria for determining the number of factors 19228:(in which each variable is scaled to have its 19118:with a standard deviation of 3 in roughly the 14701:is found by using its characteristic equation 14501:Associative algebras and representation theory 13386: 8418:that realizes that maximum is an eigenvector. 7157: 1026:(characteristic root), for what is now called 24831: 24389: 23918: 23670: 23555:Heesterbeek, J. A. P.; Diekmann, Odo (2000), 23494: 23469: 23290:Bulletin of the American Mathematical Society 23023:"Endogene Geologie - Ruhr-Universität Bochum" 22984: 22945: 22709: 22619: 22607: 22247:Lemma for linear independence of eigenvectors 20135:{\displaystyle m{\ddot {x}}+c{\dot {x}}+kx=0} 19056:{\displaystyle \cos \theta \pm i\sin \theta } 10169: 10126: 8105:or by instead left multiplying both sides by 3956:of matrix multiplication. Similarly, because 2211:Eigenvalues and the characteristic polynomial 2089:corresponding to that eigenvector. Equation ( 1175:. One of the most popular methods today, the 520:, or the language of linear transformations. 24170:, Wellesley, MA: Wellesley-Cambridge Press, 24088:"Eigenvalue Computation in the 20th Century" 23894: 23758:(3rd ed.), Cambridge University Press, 23258: 22933: 22344: 22207: 22197: 21992:recognition systems for speaker adaptation. 21767: 20951: 20896: 20787: 20749: 20725: 20684: 16637: 14532:representation-theoretical concept of weight 14523:. The study of such actions is the field of 12078: 7140: 7090: 7021: 6977: 6900: 6856: 6790: 6758: 5557:The direct sum of the eigenspaces of all of 4602:vectors orthogonal to these eigenvectors of 4032:are not zero, they are also eigenvectors of 1069:have real eigenvalues. This was extended by 75:that has its direction unchanged by a given 24845: 24049: 23903: 23789: 22960: 22835: 22823: 19303:is defined as an eigenvalue of the graph's 17898:{\displaystyle \mu _{i}=\mu (\lambda _{i})} 17691:{\displaystyle \lambda _{1}=\lambda _{2}=1} 17399:{\displaystyle \lambda _{1}=\lambda _{2}=k} 16326: 8257:. It then follows that the eigenvectors of 6407:if and only if every eigenvalue is nonzero. 5788:matrix of complex numbers with eigenvalues 4968:{\displaystyle \det(A-\xi I)=\det(D-\xi I)} 4504:. We can therefore find a (unitary) matrix 3384:then the right-hand side is the product of 3159:) factors the characteristic polynomial of 1501:{\displaystyle A\mathbf {v} =\mathbf {w} ,} 843:matrix, in which case the eigenvectors are 24838: 24824: 24396: 24382: 23714:Matrix analysis and applied linear algebra 23238: 23020: 22658:University of Michigan Mathematics (2016) 22406: 22356: 21200:can be defined by the eigenvectors of the 15829:This matrix equation is equivalent to two 15192:A similar procedure is used for solving a 13917:By definition of a linear transformation, 11646: 8204:be a non-singular square matrix such that 7669:Diagonalization and the eigendecomposition 7665:are associated with the same eigenvalues. 5577:'s eigenvalues is the entire vector space 1456:Now consider the linear transformation of 24361:Numerical solution of eigenvalue problems 24263:Learn how and when to remove this message 24114: 24067: 24045:, National Technical University of Athens 24015: 23995: 23909: 23858: 23807: 23697:. McGraw Hill Professional. p. 111. 23581:, Waltham: Blaisdell Publishing Company, 23546: 23443: 23421: 23359: 23301: 23229: 23180: 23039: 22996: 22796: 21976:, eigenfaces provide a means of applying 21658:, the fabric is said to be isotropic. If 21422:{\displaystyle E_{1}\geq E_{2}\geq E_{3}} 21290:Learn how and when to remove this message 21274:, without removing the technical details. 21242: 20461: 20356: 20349: 20342: 19220:among variables. PCA is performed on the 16647:Eigenvalues of geometric transformations 16405: 16287: 16081: 15576:is the characteristic polynomial of some 15070: 15063: 13014: 12954: 11548: 11457: 11378:Therefore, the other two eigenvectors of 10399: 10341: 10281: 8600:for which the determinant of the matrix ( 8590:of this transformation satisfy equation ( 8375: 8348: 7609: 7580: 7520: 7500: 7486: 6927: 5693: 5618: 5586: 5324:{\displaystyle \gamma _{A}(\lambda _{i})} 4415: 4408: 3853: 3062: 1446:{\displaystyle \lambda =-{\frac {1}{20}}} 494:There is a direct correspondence between 23895:Trefethen, Lloyd N.; Bau, David (1997), 23640: 23576: 23565: 23383: 23076:Xirouhakis, Votsis & Delopoulus 2004 22847: 22772: 22748: 22692: 22379: 22366:(5 ed.). Wellesley-Cambridge Press. 22238: 21920: 20987:numerous times when traversing a static 20294: 20216:at the cost of solving a larger system. 19742: 19077: 14361:Any subspace spanned by eigenvectors of 14354:operates, and there cannot be more than 12532:Matrix with repeated eigenvalues example 8430: 3884:under addition. That is, if two vectors 3153:distinct eigenvalues. Whereas equation ( 1208: 1191:Eigenvalues and eigenvectors of matrices 700: 687: 24151: 24016:Wolchover, Natalie (13 November 2019). 23694:Schaum's Easy Outline of Linear Algebra 23532: 23405: 23091: 22595: 22583: 22508: 22489: 22162:: 827–830, 845–865, 889–907, 931–937. 21757:{\displaystyle E_{1}>E_{2}>E_{3}} 20465:{\displaystyle H\psi _{E}=E\psi _{E}\,} 20315:can be seen as the eigenvectors of the 20290: 13564:{\displaystyle f(t)=f(0)e^{\lambda t},} 6934:{\displaystyle \alpha \in \mathbb {C} } 6430:is invertible, then the eigenvalues of 6129:is the product of all its eigenvalues, 4595:{\displaystyle n-\gamma _{A}(\lambda )} 4484: 4466: 4418: 4395: 3760:On one hand, this set is precisely the 3598:) equals the geometric multiplicity of 3041: 2250:is zero. Therefore, the eigenvalues of 1003:, and discovered the importance of the 921:is applied liberally when naming them: 25432: 24787:Comparison of linear algebra libraries 24183: 24165: 23840: 23729: 23151: 22887: 22883: 22784: 22760: 22477: 22394: 22285:terms it is possible to get away with 22242: 22234: 21711:, the fabric is said to be planar. If 21231:. This particular representation is a 19018:, which is a negative number whenever 19011:{\displaystyle D=-4(\sin \theta )^{2}} 14474:eigenvalues can be generalized to the 14381:can be spanned by the eigenvectors of 12097:Consider the lower triangular matrix, 7997:is the eigenvalue associated with the 6659:, every eigenvalue has absolute value 5913:{\displaystyle \mu _{A}(\lambda _{i})} 5870:{\displaystyle \mu _{A}(\lambda _{i})} 5331:. The total geometric multiplicity of 5261:, where the geometric multiplicity of 4110:is the dimension of the nullspace of ( 1108:started by Laplace, by realizing that 24819: 24377: 24188:, Belmont, CA: Thomson, Brooks/Cole, 23771: 23711: 23594: 23498:Earth Surface Processes and Landforms 23329:from the original on 19 January 2022. 23103: 23052:Diekmann, Heesterbeek & Metz 1990 22914: 22871: 22721: 22631: 22571: 22559: 22547: 22535: 22520: 22230: 22151: 21272:make it understandable to non-experts 21171: 20363:{\displaystyle n=1,\,2,\,3,\,\ldots } 19738: 19267:significance (which differs from the 16342:is to instead multiply the vector by 13682:if and only if there exists a scalar 13593: 8253:linearly independent eigenvectors of 7748:linearly independent eigenvectors of 7645:, the left and right eigenvectors of 7541:Comparing this equation to equation ( 7429:satisfying this equation is called a 5658:linearly independent eigenvectors of 4808:{\displaystyle (A-\xi I)V=V(D-\xi I)} 4553:{\displaystyle \gamma _{A}(\lambda )} 4376:{\displaystyle \gamma _{A}(\lambda )} 4087:{\displaystyle \gamma _{A}(\lambda )} 4055:, is referred to as the eigenvalue's 3625:), defined in the next section, then 1104:clarified an important aspect in the 25400: 24207: 23021:Busche, Christian; Schiller, Beate. 22417: 22415: 22112:https://books.google.com/books?id=29 21704:{\displaystyle E_{1}=E_{2}>E_{3}} 21246: 19615:{\textstyle 1/{\sqrt {\deg(v_{i})}}} 19158:is more readily visualized than the 18188: 17852: 16606:was designed in 1961. Combining the 16412:{\displaystyle \mu \in \mathbb {C} } 16044:. Therefore, any vector of the form 14555: 14342:. As a consequence, eigenvectors of 13692: 8233:must therefore be an eigenvector of 7227:in the defining equation, equation ( 5738:Additional properties of eigenvalues 2430: 2260: 2114: 2001: 512:vector space into itself, given any 25412: 24186:Linear algebra and its applications 24056:Linear Algebra and Its Applications 23241:The New Cassell's German Dictionary 22321:operations, but that does not take 22037:List of numerical-analysis software 21764:, the fabric is said to be linear. 20902:{\displaystyle H|\Psi _{E}\rangle } 20382:. The center of each figure is the 19425:{\displaystyle I-D^{-1/2}AD^{-1/2}} 19326:, or (increasingly) of the graph's 15393: 14534:is an analog of eigenvalues, while 14244:are either zero or eigenvectors of 13621:be a linear transformation mapping 13030:. The total geometric multiplicity 8901:, which are the two eigenvalues of 8608:) equals zero are the eigenvalues. 7034:. More generally, for a polynomial 2811:, which are the two eigenvalues of 2677:, the characteristic polynomial of 2300:{\displaystyle \det(A-\lambda I)=0} 1460:-dimensional vectors defined by an 1096:found the corresponding result for 999:studied the rotational motion of a 505:and linear transformations from an 13: 24403: 24078: 23386:A First Course In Abstract Algebra 23234:, London: Arnold, pp. 103–107 22860:Friedberg, Insel & Spence 1989 20957:{\displaystyle |\Psi _{E}\rangle } 20942: 20887: 20793:{\displaystyle |\Psi _{E}\rangle } 20778: 20740: 20716: 20690:{\displaystyle |\Psi _{E}\rangle } 20675: 19084:multivariate Gaussian distribution 17263:{\displaystyle \ (\lambda -1)^{2}} 17100:{\displaystyle \ (\lambda -k)^{2}} 16703: 16247:, that is, any vector of the form 14693:The solution of this equation for 14463:) may not have an inverse even if 14416: 14283:is therefore a linear subspace of 13366:{\displaystyle Df(t)=\lambda f(t)} 13312:real functions of a real argument 8421: 8150:{\displaystyle Q^{-1}AQ=\Lambda .} 8141: 8095:{\displaystyle A=Q\Lambda Q^{-1},} 8073: 8027: 7691:linearly independent eigenvectors 2327:, the left-hand side of equation ( 1144:At the start of the 20th century, 525:infinite-dimensional vector spaces 79:. More precisely, an eigenvector, 21:Characteristic equation (calculus) 14: 25471: 24203: 24155:An introduction to linear algebra 22412: 22206:: ... ) Later on the same page: 21651:{\displaystyle E_{1}=E_{2}=E_{3}} 20967: 20596:functions. Since this space is a 19809:{\displaystyle m{\ddot {x}}+kx=0} 19216:(PCA) in statistics. PCA studies 16597: 15094:for use in the solution equation 13772:corresponding to the eigenvector 13391:Consider the derivative operator 12188:The characteristic polynomial of 11748:The characteristic polynomial of 10417:or any nonzero multiple thereof. 9827:The characteristic polynomial of 9570:solves this equation. Therefore, 9146:solves this equation. Therefore, 8451: 8245:must be linearly independent for 4106:), the geometric multiplicity of 2361:, except that its term of degree 1999:are scalar multiples, that is if 1221:, not changing its direction, so 25411: 25399: 25388: 25387: 25375: 24800: 24799: 24777:Basic Linear Algebra Subprograms 24535: 24367:, Jack Dongarra, Axel Ruhe, and 24336: 24212: 23732:Linear Algebra and Matrix Theory 23155:A first course in linear algebra 23009:Knox-Robinson & Gardoll 1998 21509:{\displaystyle \mathbf {v} _{3}} 21496: 21480:{\displaystyle \mathbf {v} _{2}} 21467: 21451:{\displaystyle \mathbf {v} _{1}} 21438: 21356: 21341: 21326: 21251: 21087: 21076: 21033: 21022: 20999: 20266: 19991:{\displaystyle kx=\omega ^{2}mx} 19853:{\displaystyle m{\ddot {x}}=-kx} 19717: 18895: 18846: 18783: 18713: 18661: 18590: 18541: 16712: 16696: 16689: 16682: 16580: 16561:{\displaystyle \mathbf {v} ^{*}} 16548: 16519: 16508: 16500: 16486: 16431: 14206: 14182: 14158: 14150: 14129: 14121: 14029: 14005: 13981: 13964: 13943: 13935: 13866: 13852: 13838: 13723: 13709: 13602:on arbitrary vector spaces. Let 13418:{\displaystyle {\tfrac {d}{dt}}} 12460: 12398: 12329: 12007: 11948: 11889: 11609: 11587: 11482: 11391: 9732:Three-dimensional matrix example 9714:associated with the eigenvalues 9579: 9314: 9155: 8945: 8504:= and blue vectors parallel to 8404: 8382: 8369: 8358: 8342: 7957: 7928: 7904: 7811: 7792: 7778: 7514: 7494: 7324: 7310: 7255: 7244: 6695:{\displaystyle |\lambda _{i}|=1} 5706:{\displaystyle \mathbb {C} ^{n}} 5631:{\displaystyle \mathbb {C} ^{n}} 5599:{\displaystyle \mathbb {C} ^{n}} 4043:The dimension of the eigenspace 3952:. This can be checked using the 3866:{\displaystyle \mathbb {C} ^{n}} 3736: 3728: 3698: 2937: 2883: 2858: 2850: 2369:. This polynomial is called the 2325:Leibniz formula for determinants 2155: 2147: 2112:) can be stated equivalently as 2034: 2023: 2015: 1491: 1483: 1398: 1387: 1302: 1249: 1179:, was proposed independently by 1129:studied the first eigenvalue of 1058:Théorie analytique de la chaleur 948:associated with that eigenvalue. 881: 870: 757:{\displaystyle {\tfrac {d}{dx}}} 644: 630: 477: 466: 433: 399: 377: 352: 303: 167: 156: 87: 38: 25296:Computational complexity theory 24675:Seven-dimensional cross product 23340:Journal of Mathematical Biology 23064:Heesterbeek & Diekmann 2000 23014: 22877: 22865: 22251: 22245:, Theorem EDELI on p. 469; and 22229:For a proof of this lemma, see 22223: 22176: 22145: 22074: 21778:The basic reproduction number ( 21216:procedure, called in this case 21161:{\displaystyle \tau _{\min }=0} 21128:{\displaystyle \tau _{\max }=1} 19689:of its vertices. An example is 19255:, such as those encountered in 16632: 16621:is one example of an efficient 15611: 15552:is 4 or less. According to the 13043:Eigenvector-eigenvalue identity 12457: 12395: 12004: 11945: 10966: 10934: 9123:{\displaystyle 1v_{1}+1v_{2}=0} 7618:{\displaystyle A^{\textsf {T}}} 7589:{\displaystyle A^{\textsf {T}}} 6628:is not only Hermitian but also 2934: 2416:, being a polynomial of degree 1300: 1292: 1084:proved that the eigenvalues of 1073:in 1855 to what are now called 963:, then this basis is called an 932:The set of all eigenvectors of 710:The example here, based on the 604:is a nonzero vector that, when 24304:Matrix Eigenvectors Calculator 24168:Introduction to linear algebra 23239:Betteridge, Harold T. (1965), 23199:10.1103/physrevlett.125.165901 22737:Beauregard & Fraleigh 1973 22360:Introduction to Linear Algebra 22350: 22308: 22295: 21233:generalized eigenvalue problem 20937: 20882: 20773: 20735: 20711: 20670: 19955:generalized eigenvalue problem 19607: 19594: 19486:equal to the degree of vertex 19137: 19125: 19105: 19093: 19070:) has reciprocal eigenvalues. 18999: 18986: 18228: 18215: 17892: 17879: 17306: 17300: 17251: 17238: 17205: 17199: 17156: 17137: 17134: 17115: 17088: 17075: 16381:{\displaystyle (A-\mu I)^{-1}} 16366: 16350: 16303:, for any nonzero real number 16097:, for any nonzero real number 15405: 15379: 14507:Weight (representation theory) 14210: 14199: 14186: 14175: 14162: 14146: 14133: 14117: 14033: 14025: 14009: 13998: 13985: 13977: 13968: 13960: 13947: 13931: 13856: 13848: 13713: 13705: 13645: 13606:be any vector space over some 13590:article gives other examples. 13542: 13536: 13527: 13521: 13474: 13468: 13456: 13450: 13360: 13354: 13342: 13336: 13316:. The eigenvalue equation for 13207: 13181: 13158: 13155: 13142: 13116: 13089: 13067: 12855: 12842: 12833: 12820: 12687: 12672: 12265: 12253: 12250: 12238: 12235: 12223: 12217: 12202: 11825: 11813: 11810: 11798: 11795: 11783: 11777: 11762: 10158: 10146: 10143: 10131: 10121: 10109: 9860: 9845: 9309: 9294: 8940: 8928: 8865: 8853: 8850: 8838: 8644: 8629: 8427:Two-dimensional matrix example 8249:to be invertible, there exist 7865:by its associated eigenvalue, 7683:form a basis, or equivalently 7675:Eigendecomposition of a matrix 7137: 7124: 7109: 7096: 7070: 7064: 6682: 6667: 6147: 6141: 5969: 5963: 5907: 5894: 5864: 5851: 5423: 5410: 5318: 5305: 5153: 5147: 5131: 5125: 5073: 5067: 5053: 5040: 5020: 5005: 4962: 4947: 4938: 4923: 4802: 4787: 4775: 4760: 4712: 4706: 4589: 4583: 4547: 4541: 4439: 4433: 4370: 4364: 4334: 4328: 4312: 4306: 4268: 4262: 4246: 4240: 4194: 4179: 4161: 4155: 4081: 4075: 3646:Given a particular eigenvalue 3442: 3429: 3356: 3343: 3329: 3309: 3301: 3288: 3274: 3254: 3249: 3236: 3222: 3202: 3196: 3181: 2706: 2691: 2530: 2511: 2505: 2486: 2483: 2464: 2458: 2443: 2402:fundamental theorem of algebra 2288: 2273: 1217:acts by stretching the vector 1043:used the work of Lagrange and 634: 626: 101:, of a linear transformation, 1: 24116:10.1016/S0377-0427(00)00413-1 23635:10.1016/S0098-3004(97)00122-2 21916: 21306:, especially in the study of 19143:{\displaystyle (0.878,0.478)} 18442:{\displaystyle \gamma _{1}=1} 18268:{\displaystyle \gamma _{1}=2} 16186:above has another eigenvalue 14476:spectrum of a linear operator 14447:, and therefore its inverse ( 14350:of the vector space on which 13799:is the product of the scalar 13666:We say that a nonzero vector 8196:Conversely, suppose a matrix 8036:{\displaystyle AQ=Q\Lambda .} 5546:{\displaystyle \gamma _{A}=n} 5026:{\displaystyle \det(D-\xi I)} 4975:. But from the definition of 2997:If the entries of the matrix 2077:of the linear transformation 1363:These vectors are said to be 384:{\displaystyle A\mathbf {v} } 258: 25460:Singular value decomposition 24517:Eigenvalues and eigenvectors 24344:Eigenvalues and eigenvectors 24297:– A visual explanation with 23826:10.1103/RevModPhys.89.015005 23685:10.1016/0041-5553(63)90168-X 23548:10.1016/0315-0860(75)90032-4 23230:Benn, D.; Evans, D. (2004), 22423:"Eigenvector and Eigenvalue" 22332: 22052:Quadratic eigenvalue problem 21962:principal component analysis 21006:{\displaystyle \mathbf {t} } 20144:quadratic eigenvalue problem 19285:structural equation modeling 19214:principal component analysis 19174:Positive semidefinite matrix 19168:Principal component analysis 19074:Principal component analysis 17352:{\displaystyle \lambda _{i}} 16587:{\displaystyle \mathbf {v} } 16438:{\displaystyle \mathbf {v} } 15410:The eigenvalues of a matrix 8411:{\displaystyle \mathbf {x} } 8330:is the maximum value of the 8296:Variational characterization 8261:form a basis if and only if 8179:to the diagonal matrix Λ or 7714:with associated eigenvalues 7679:Suppose the eigenvectors of 6849:is the identity matrix) are 5678:; such a basis is called an 5281:{\displaystyle \lambda _{i}} 3880:is a linear subspace, it is 3764:or nullspace of the matrix ( 951:If a set of eigenvectors of 569:of the rotational motion of 447:is called an eigenvector of 440:{\displaystyle \mathbf {v} } 406:{\displaystyle \mathbf {v} } 359:{\displaystyle \mathbf {v} } 310:{\displaystyle \mathbf {v} } 94:{\displaystyle \mathbf {v} } 16:Concepts from linear algebra 7: 24291:– lecture from Khan Academy 23996:Weisstein, Eric W. (n.d.). 23615:Computers & Geosciences 23599:, Oxford University Press, 22903:Lipschutz & Lipson 2002 21995: 21928:as examples of eigenvectors 20844:represents the eigenvalue. 20231:Tensor of moment of inertia 20018:{\displaystyle \omega ^{2}} 19882:to be sinusoidal in time). 19236:and the eigenvalues to the 14389:is the entire vector space 14087:associated with eigenvalue 13746: 13387:Derivative operator example 9279: 8917: 8592: 8215:. Left multiplying both by 7543: 7229: 7158:Left and right eigenvectors 6304:, for any positive integer 6277:; i.e., the eigenvalues of 3675: 3390: 3155: 3109:) of the eigenvalue is its 3006:even if all the entries of 2552: 2381: 2329: 2313: 2223: 2178: 2108: 2091: 2057: 1148:studied the eigenvalues of 1014:In the early 19th century, 600:of a linear transformation 596:In essence, an eigenvector 530: 284:{\displaystyle n{\times }n} 123:scaled by a constant factor 10: 25476: 25346:Films about mathematicians 24356:Computation of Eigenvalues 24161:, Brigham Young University 23841:Shilov, Georgi E. (1977), 23734:(2nd ed.), New York: 23384:Fraleigh, John B. (1976), 23152:Beezer, Robert A. (2006), 23108:(5th ed.), New York: 23084: 22137:: 184–252; see especially 22108:Specimen theoriae turbinum 21931: 21771: 20239:, the eigenvectors of the 19761:. The eigenvalues are the 19750: 19456:is a diagonal matrix with 19171: 19165: 18106:{\displaystyle \mu _{1}=2} 17932:{\displaystyle \mu _{1}=2} 16608:Householder transformation 16330: 16205:{\displaystyle \lambda =1} 16156:{\displaystyle \lambda =6} 15618:system of linear equations 15383: 14504: 14481:as the set of all scalars 14420: 13273: 13051:, the norm squared of the 8435:The transformation matrix 8299: 7672: 7161: 7054:the eigenvalues of matrix 6963:{\displaystyle \alpha I+A} 5877:times in this list, where 5834:. Each eigenvalue appears 5480:of all the eigenspaces of 4674:{\displaystyle D:=V^{T}AV} 4098:is also the nullspace of ( 3031:intermediate value theorem 2665:Taking the determinant of 2349:, the order of the matrix 2258:that satisfy the equation 2214: 1194: 971: 193:is the multiplying factor 18: 25369: 25319: 25276: 25186: 25148: 25115: 25067: 25039: 24986: 24933: 24915:Philosophy of mathematics 24890: 24855: 24795: 24757: 24713: 24650: 24602: 24544: 24533: 24429: 24411: 24349: 24325:{\displaystyle n\times n} 24152:Kuttler, Kenneth (2017), 24069:10.1016/j.laa.2024.03.035 23796:Reviews of Modern Physics 23388:(2nd ed.), Reading: 23106:Elementary Linear Algebra 23096:, in Miller, Jeff (ed.), 22985:Graham & Midgley 2000 22946:Vellekoop & Mosk 2007 22710:Golub & Van Loan 1996 22671:. Accessed on 2016-03-27. 22649:. Accessed on 2016-03-27. 22620:Golub & Van Loan 1996 22233:, Theorem 8.2 on p. 186; 21987:Similar to this concept, 21774:Basic reproduction number 21768:Basic reproduction number 20628:{\displaystyle \psi _{E}} 20585:{\displaystyle \psi _{E}} 20523:{\displaystyle \psi _{E}} 20321:angular momentum operator 20317:hydrogen atom Hamiltonian 19332:discrete Laplace operator 19290: 18522: 18186: 17850: 17331: 17060: 16720: 16678: 16671: 16666: 16661: 16658: 16653: 16638:Geometric transformations 15495:{\displaystyle n\times n} 15449:{\displaystyle 2\times 2} 14846: – 1 equations 14373:, and the restriction of 13657:{\displaystyle T:V\to V.} 13425:with eigenvalue equation 12079:Triangular matrix example 10427:cyclic permutation matrix 8169:similarity transformation 7402:{\displaystyle 1\times n} 7200:{\displaystyle n\times n} 6744:{\displaystyle n\times n} 5781:{\displaystyle n\times n} 3800:equals the nullspace of ( 2372:characteristic polynomial 2357:depend on the entries of 2337:function of the variable 2227:) has a nonzero solution 2217:Characteristic polynomial 25351:Recreational mathematics 24184:Strang, Gilbert (2006), 24166:Strang, Gilbert (1993), 24145:University of Nottingham 24050:Van Mieghem, P. (2024). 23897:Numerical Linear Algebra 23730:Nering, Evar D. (1970), 23649:(2nd Revised ed.), 23577:Herstein, I. N. (1964), 22934:Trefethen & Bau 1997 22892:Lemma for the eigenspace 22459:Wolfram.com: Eigenvector 22345:Burden & Faires 1993 22314:{\displaystyle O(n^{4})} 22169:équation caractéristique 22067: 21968:of some of them. In the 21960:; this is an example of 20241:moment of inertia tensor 19733:Perron–Frobenius theorem 19728:transition probabilities 19544:{\displaystyle D^{-1/2}} 19269:statistical significance 19249:dimensionality reduction 16327:Simple iterative methods 15926: 15922: 14550:Langlands correspondence 14485:for which the operator ( 13379:and are commonly called 10755:For the real eigenvalue 10744:{\displaystyle i^{2}=-1} 9556:Any nonzero vector with 9132:Any nonzero vector with 8274:generalized eigenvectors 8211:is some diagonal matrix 7164:left and right (algebra) 5476:is the dimension of the 5101:{\displaystyle \lambda } 4289:To prove the inequality 3844:is a linear subspace of 1055:in his famous 1822 book 206:{\displaystyle \lambda } 138:{\displaystyle \lambda } 25236:Mathematical statistics 25226:Mathematical psychology 25196:Engineering mathematics 25130:Algebraic number theory 24363:Edited by Zhaojun Bai, 23774:Advanced linear algebra 23712:Meyer, Carl D. (2000), 23169:Physical Review Letters 22961:Rotter & Gigan 2017 22323:combinatorial explosion 21180:, and in particular in 20225:finite element analysis 20038:{\displaystyle \omega } 19703:stationary distribution 19362:combinatorial Laplacian 16117:, is an eigenvector of 13264:diagonalizable matrices 13258:formed by removing the 12903:On the other hand, the 12092:upper triangular matrix 11647:Diagonal matrix example 8290:generalized eigenspaces 8241:. Since the columns of 8200:is diagonalizable. Let 8046:Because the columns of 7466:{\displaystyle \kappa } 7409:matrix. Any row vector 7356:{\displaystyle \kappa } 6237:The eigenvalues of the 5208:{\displaystyle d\leq n} 4906:{\displaystyle D-\xi I} 4877:{\displaystyle A-\xi I} 3876:Because the eigenspace 3673:that satisfy equation ( 3076:be an eigenvalue of an 2387:characteristic equation 1375:, if there is a scalar 1112:can cause instability. 1098:skew-symmetric matrices 1053:separation of variables 1033:characteristic equation 1030:; his term survives in 929:of that transformation. 25382:Mathematics portal 25231:Mathematical sociology 25211:Mathematical economics 25206:Mathematical chemistry 25135:Analytic number theory 25016:Differential equations 24502:Row and column vectors 24326: 24277:What are Eigen Values? 23772:Roman, Steven (2008), 23595:Kline, Morris (1972), 23566:Hefferon, Jim (2001), 23445:10.1093/comjnl/4.4.332 23423:10.1093/comjnl/4.3.265 23104:Anton, Howard (1987), 23092:Aldrich, John (2006), 23027:www.ruhr-uni-bochum.de 22315: 22279: 22208: 22198: 22042:Nonlinear eigenproblem 21929: 21907: 21886:has passed. The value 21880: 21853: 21826: 21799: 21758: 21705: 21652: 21599: 21572: 21545: 21510: 21481: 21452: 21423: 21370: 21243:Geology and glaciology 21162: 21129: 21095: 21061: 21041: 21007: 20958: 20923: 20903: 20858: 20838: 20818: 20794: 20756: 20691: 20649: 20629: 20604:, one can introduce a 20586: 20548: 20524: 20489: 20466: 20408: 20391: 20364: 20221:differential equations 20214:algebraic manipulation 20204: 20136: 20067: 20039: 20025:is the eigenvalue and 20019: 19992: 19943: 19919: 19899: 19876: 19854: 19810: 19748: 19676: 19656: 19636: 19616: 19565: 19545: 19507: 19480: 19479:{\displaystyle D_{ii}} 19450: 19432:(sometimes called the 19426: 19360:(sometimes called the 19354: 19320: 19251:in the study of large 19163: 19144: 19112: 19057: 19012: 18949: 18826: 18767: 18641: 18513: 18443: 18409: 18339: 18269: 18235: 18177: 18107: 18073: 18003: 17933: 17899: 17841: 17692: 17645: 17484: 17400: 17353: 17322: 17264: 17221: 17163: 17101: 17051: 16973: 16919: 16838: 16770: 16708: 16588: 16562: 16530: 16459: 16439: 16413: 16382: 16317: 16297: 16241: 16240:{\displaystyle 3x+y=0} 16206: 16180: 16157: 16131: 16111: 16091: 16038: 16007: 15915: 15821: 15707: 15673: 15594: 15570: 15546: 15519: 15496: 15470:Wilkinson's polynomial 15450: 15424: 15370: 15183: 15088: 15033: 14957: 14833: 14684: 14513:algebra representation 14467:is not an eigenvalue. 14409:admits an eigenbasis, 14358:distinct eigenvalues. 14296:geometric multiplicity 14224: 14047: 13882: 13734: 13658: 13600:linear transformations 13575:= 0 the eigenfunction 13565: 13484: 13419: 13367: 13294:differential operators 13248: 13221: 13024: 12964: 12905:geometric multiplicity 12881:algebraic multiplicity 12871: 12656: 12520: 12275: 12180: 12067: 11835: 11740: 11638: 11558: 11467: 11370: 11187: 11002: 10890: 10745: 10704: 10684: 10511: 10409: 10351: 10291: 10229: 9819: 9671: 9548: 9253: 9124: 9073: 8879: 8578: 8519: 8488: 8412: 8390: 8324: 8151: 8096: 8037: 7982: 7861:scales each column of 7836: 7744:whose columns are the 7659: 7639: 7619: 7590: 7561: 7533: 7467: 7447: 7423: 7403: 7377: 7357: 7335: 7296: 7266: 7221: 7201: 7147: 7077: 7048: 7028: 6964: 6935: 6907: 6843: 6823: 6797: 6745: 6719: 6696: 6649: 6622: 6591: 6571: 6541: 6514: 6454: 6453:{\displaystyle A^{-1}} 6424: 6397: 6374: 6318: 6298: 6271: 6251: 6227: 6173: 6123: 6095: 6032: 5995: 5942: 5914: 5871: 5828: 5782: 5756: 5727: 5707: 5672: 5652: 5632: 5600: 5571: 5547: 5514: 5494: 5470: 5399: 5345: 5325: 5282: 5255: 5209: 5183: 5160: 5102: 5082: 5027: 4989: 4969: 4907: 4878: 4849: 4829: 4809: 4753:on both sides, we get 4747: 4746:{\displaystyle -\xi V} 4721: 4675: 4636: 4616: 4596: 4554: 4518: 4498: 4448: 4377: 4341: 4281: 4204: 4088: 4057:geometric multiplicity 3867: 3752: 3541: 3495: 3368: 3111:multiplicity as a root 3090:algebraic multiplicity 3063:Algebraic multiplicity 2989: 2866: 2795: 2657: 2540: 2345:of this polynomial is 2301: 2166: 2045: 1983: 1952: 1822: 1502: 1447: 1409: 1355: 1230: 1122:Sturm–Liouville theory 1080:Around the same time, 1063:Charles-François Sturm 1024:racine caractéristique 990:differential equations 898:where the eigenvector 892: 829: 758: 707: 698: 655: 591:matrix diagonalization 485: 441: 407: 385: 360: 334: 311: 285: 217:Geometrically, vectors 207: 175: 139: 115: 95: 25361:Mathematics education 25291:Theory of computation 25011:Hypercomplex analysis 24507:Row and column spaces 24452:Scalar multiplication 24327: 24002:mathworld.wolfram.com 23982:mathworld.wolfram.com 23647:New York: McGraw-Hill 23040:Benn & Evans 2004 22997:Sneed & Folk 1958 22987:, pp. 1473–1477. 22948:, pp. 2309–2311. 22661:Math Course Catalogue 22316: 22280: 22185:David Hilbert (1904) 22104:Johann Andreas Segner 22002:Antieigenvalue theory 21924: 21908: 21906:{\displaystyle R_{0}} 21881: 21879:{\displaystyle t_{G}} 21854: 21852:{\displaystyle t_{G}} 21827: 21825:{\displaystyle R_{0}} 21800: 21798:{\displaystyle R_{0}} 21759: 21706: 21653: 21600: 21598:{\displaystyle E_{3}} 21573: 21571:{\displaystyle E_{2}} 21546: 21544:{\displaystyle E_{1}} 21511: 21487:is the secondary and 21482: 21453: 21424: 21376:by their eigenvalues 21371: 21218:self-consistent field 21206:ionization potentials 21163: 21130: 21096: 21062: 21060:{\displaystyle \tau } 21042: 21008: 20959: 20924: 20904: 20869:self-adjoint operator 20859: 20839: 20819: 20795: 20757: 20692: 20650: 20630: 20587: 20554:, interpreted as its 20549: 20525: 20501:differential operator 20490: 20467: 20409: 20365: 20298: 20205: 20142:leads to a so-called 20137: 20068: 20040: 20020: 19993: 19944: 19920: 19900: 19877: 19855: 19811: 19746: 19677: 19657: 19637: 19617: 19571:th diagonal entry is 19566: 19546: 19508: 19506:{\displaystyle v_{i}} 19481: 19451: 19427: 19355: 19321: 19299:, an eigenvalue of a 19297:spectral graph theory 19203:multivariate analysis 19191:positive semidefinite 19145: 19113: 19111:{\displaystyle (1,3)} 19081: 19058: 19013: 18950: 18827: 18768: 18642: 18514: 18444: 18410: 18340: 18270: 18236: 18178: 18108: 18074: 18004: 17934: 17900: 17842: 17693: 17646: 17485: 17401: 17354: 17323: 17265: 17222: 17164: 17102: 17052: 16974: 16920: 16839: 16771: 16707: 16589: 16563: 16531: 16460: 16440: 16414: 16383: 16318: 16298: 16242: 16207: 16181: 16158: 16132: 16112: 16092: 16039: 16008: 15916: 15822: 15708: 15706:{\displaystyle Av=6v} 15674: 15595: 15571: 15547: 15520: 15497: 15451: 15425: 15371: 15194:differential equation 15184: 15089: 15043:characteristic roots 15034: 14958: 14834: 14685: 14525:representation theory 14435:, then the operator ( 14225: 14048: 13910:associated with 13883: 13735: 13659: 13566: 13485: 13420: 13368: 13322:differential equation 13249: 13222: 13025: 12965: 12872: 12657: 12521: 12276: 12181: 12068: 11836: 11741: 11639: 11559: 11468: 11371: 11188: 11003: 10891: 10746: 10705: 10685: 10512: 10410: 10352: 10292: 10230: 9820: 9679:is an eigenvector of 9672: 9549: 9259:is an eigenvector of 9254: 9125: 9074: 8880: 8596:), and the values of 8579: 8489: 8487:{\displaystyle \left} 8434: 8413: 8391: 8325: 8152: 8097: 8038: 7983: 7849:is an eigenvector of 7845:Since each column of 7837: 7660: 7640: 7620: 7591: 7562: 7534: 7468: 7448: 7424: 7404: 7378: 7358: 7336: 7297: 7267: 7222: 7202: 7148: 7078: 7049: 7029: 6965: 6941:, the eigenvalues of 6936: 6908: 6844: 6824: 6798: 6746: 6720: 6697: 6650: 6623: 6592: 6577:, or equivalently if 6572: 6570:{\displaystyle A^{*}} 6542: 6522:reciprocal polynomial 6515: 6455: 6425: 6398: 6375: 6319: 6299: 6297:{\displaystyle A^{k}} 6272: 6252: 6228: 6153: 6124: 6096: 6012: 5975: 5943: 5915: 5872: 5829: 5783: 5757: 5728: 5708: 5673: 5653: 5633: 5601: 5572: 5548: 5515: 5495: 5471: 5379: 5346: 5326: 5283: 5256: 5215:distinct eigenvalues 5210: 5184: 5161: 5103: 5083: 5028: 4990: 4970: 4908: 4879: 4850: 4830: 4810: 4748: 4722: 4676: 4637: 4617: 4597: 4555: 4519: 4499: 4449: 4378: 4342: 4282: 4205: 4089: 3974:is a complex number, 3954:distributive property 3868: 3753: 3636:semisimple eigenvalue 3542: 3475: 3369: 2990: 2867: 2796: 2658: 2541: 2302: 2167: 2081:and the scale factor 2046: 1984: 1932: 1828:where, for each row, 1823: 1503: 1448: 1410: 1356: 1225:is an eigenvector of 1212: 1162:Hermann von Helmholtz 1016:Augustin-Louis Cauchy 1009:Joseph-Louis Lagrange 995:In the 18th century, 893: 830: 759: 728:differential operator 704: 691: 656: 486: 442: 408: 386: 361: 335: 312: 295:and a nonzero vector 286: 208: 176: 140: 116: 96: 77:linear transformation 69:characteristic vector 25450:Mathematical physics 25341:Informal mathematics 25221:Mathematical physics 25216:Mathematical finance 25201:Mathematical biology 25140:Diophantine geometry 24642:Gram–Schmidt process 24594:Gaussian elimination 24310: 24233:improve this article 24131:Hill, Roger (2009). 23945:10.1364/OL.32.002309 23535:Historia Mathematica 23475:Van Loan, Charles F. 23432:The Computer Journal 23409:The Computer Journal 23136:Houghton Mifflin Co. 22848:Korn & Korn 2000 22724:, pp. 305, 307. 22382:, pp. 228, 229. 22289: 22269: 22259:Gaussian elimination 22062:Spectrum of a matrix 22022:Eigenvalue algorithm 21890: 21863: 21836: 21809: 21782: 21715: 21662: 21609: 21582: 21555: 21528: 21491: 21462: 21433: 21380: 21321: 21139: 21106: 21071: 21051: 21017: 20995: 20933: 20913: 20875: 20848: 20828: 20808: 20769: 20704: 20666: 20639: 20612: 20600:with a well-defined 20592:within the space of 20569: 20538: 20507: 20499:, is a second-order 20479: 20429: 20416:Schrödinger equation 20398: 20327: 20303:associated with the 20291:Schrödinger equation 20150: 20081: 20073:alone. Furthermore, 20057: 20029: 20002: 19960: 19933: 19909: 19889: 19866: 19820: 19773: 19666: 19646: 19626: 19575: 19555: 19517: 19490: 19460: 19440: 19434:normalized Laplacian 19368: 19338: 19310: 19234:principal components 19122: 19090: 19026: 18971: 18837: 18778: 18652: 18532: 18526:All nonzero vectors 18454: 18420: 18350: 18280: 18246: 18196: 18118: 18084: 18014: 17944: 17910: 17860: 17703: 17656: 17495: 17411: 17364: 17336: 17275: 17232: 17174: 17112: 17069: 16984: 16930: 16849: 16781: 16727: 16576: 16543: 16472: 16449: 16427: 16395: 16347: 16307: 16251: 16216: 16190: 16170: 16141: 16121: 16101: 16048: 16037:{\displaystyle y=2x} 16019: 15931: 15836: 15717: 15685: 15624: 15584: 15560: 15554:Abel–Ruffini theorem 15536: 15525:different products. 15506: 15480: 15434: 15414: 15386:Eigenvalue algorithm 15203: 15101: 15047: 14971: 14850: 14708: 14571: 14562:difference equations 14470:For this reason, in 14431:is an eigenvalue of 14107: 14083:are eigenvectors of 13921: 13904:characteristic space 13823: 13815:Given an eigenvalue 13699: 13633: 13515: 13510:exponential function 13508:. Its solution, the 13429: 13395: 13327: 13231: 13063: 12974: 12911: 12666: 12540: 12324: 12283:which has the roots 12196: 12101: 11884: 11843:which has the roots 11756: 11661: 11582: 11477: 11386: 11382:are complex and are 11197: 11014: 10902: 10766: 10719: 10694: 10527: 10432: 10364: 10303: 10246: 9835: 9740: 9736:Consider the matrix 9710:are eigenvectors of 9574: 9287: 9150: 9082: 8925: 8619: 8526: 8522:Consider the matrix 8443: 8400: 8337: 8314: 8116: 8061: 8012: 7872: 7853:, right multiplying 7759: 7649: 7629: 7600: 7571: 7551: 7477: 7457: 7437: 7413: 7387: 7367: 7347: 7306: 7286: 7237: 7211: 7185: 7087: 7076:{\displaystyle P(A)} 7058: 7038: 6974: 6945: 6917: 6853: 6833: 6807: 6755: 6729: 6709: 6663: 6639: 6612: 6581: 6554: 6531: 6464: 6434: 6414: 6387: 6328: 6308: 6281: 6261: 6241: 6135: 6113: 5954: 5932: 5881: 5838: 5792: 5766: 5746: 5717: 5688: 5662: 5642: 5613: 5581: 5561: 5524: 5504: 5484: 5355: 5335: 5292: 5265: 5219: 5193: 5173: 5112: 5092: 5037: 4999: 4979: 4917: 4888: 4859: 4839: 4819: 4757: 4731: 4685: 4646: 4626: 4606: 4564: 4528: 4508: 4458: 4390: 4351: 4293: 4221: 4142: 4062: 3848: 3818:characteristic space 3683: 3402: 3175: 3163:into the product of 3042:Spectrum of a matrix 2878: 2824: 2685: 2605: 2437: 2424:into the product of 2267: 2207:is the zero vector. 2121: 2008: 1832: 1512: 1476: 1421: 1383: 1245: 1201:Matrix (mathematics) 1045:Pierre-Simon Laplace 942:characteristic space 908:decompose the matrix 863: 772: 734: 620: 541:is adopted from the 459: 429: 395: 370: 348: 321: 299: 267: 197: 187:characteristic value 149: 129: 105: 83: 25356:Mathematics and art 25266:Operations research 25021:Functional analysis 24772:Numerical stability 24652:Multilinear algebra 24627:Inner product space 24477:Linear independence 24245:footnote references 24107:2000JCoAM.123...35G 23976:Weisstein, Eric W. 23937:2007OptL...32.2309V 23873:1958JG.....66..114S 23818:2017RvMP...89a5005R 23750:Press, William H.; 23655:1968mhse.book.....K 23627:1998CG.....24..243K 23511:2000ESPL...25.1473G 23479:Matrix computations 23191:2020PhRvL.125p5901B 23054:, pp. 365–382. 23042:, pp. 103–107. 22999:, pp. 114–150. 22763:, pp. 115–116. 22598:, pp. 265–271. 22574:, p. 1063, p.. 22263:formal power series 20376:probability density 20045:is the (imaginary) 19763:natural frequencies 19712:spectral clustering 19353:{\displaystyle D-A} 19210:covariance matrices 16673:Hyperbolic rotation 16648: 16570:conjugate transpose 15502:matrix is a sum of 15175: 15141: 14517:associative algebra 14472:functional analysis 14413:is diagonalizable. 14334:The eigenspaces of 14310:) of an eigenvalue 13819:, consider the set 11630: 10981: 10949: 10641: 8265:is diagonalizable. 6822:{\displaystyle I+A} 6549:conjugate transpose 6369: 6345: 5638:can be formed from 4118:), also called the 2097:eigenvalue equation 1141:a few years later. 1086:orthogonal matrices 663:eigenvalue equation 661:referred to as the 191:characteristic root 25301:Numerical analysis 24910:Mathematical logic 24905:Information theory 24482:Linear combination 24369:Henk van der Vorst 24322: 23861:Journal of Geology 23752:Teukolsky, Saul A. 23641:Korn, Granino A.; 23352:10.1007/BF00178324 23263:Numerical Analysis 23245:Funk & Wagnall 22973:Bender et al. 2020 22850:, Section 14.3.5a. 22812:Denton et al. 2022 22667:2015-11-01 at the 22608:Kublanovskaya 1962 22427:www.mathsisfun.com 22311: 22275: 22032:Jordan normal form 21970:facial recognition 21966:linear combination 21930: 21903: 21876: 21849: 21822: 21795: 21754: 21701: 21648: 21595: 21568: 21541: 21506: 21477: 21448: 21419: 21366: 21237:Roothaan equations 21198:molecular orbitals 21172:Molecular orbitals 21158: 21125: 21091: 21057: 21037: 21003: 20954: 20919: 20899: 20854: 20834: 20814: 20790: 20752: 20687: 20645: 20625: 20582: 20544: 20520: 20485: 20462: 20404: 20392: 20360: 20319:as well as of the 20200: 20132: 20063: 20035: 20015: 19988: 19939: 19915: 19895: 19872: 19850: 19806: 19759:degrees of freedom 19749: 19739:Vibration analysis 19672: 19652: 19632: 19612: 19561: 19541: 19503: 19476: 19446: 19422: 19350: 19334:, which is either 19316: 19273:hypothesis testing 19238:variance explained 19226:correlation matrix 19184:eigendecomposition 19164: 19156:standard deviation 19140: 19108: 19053: 19008: 18962:quadratic equation 18945: 18943: 18935: 18883: 18822: 18816: 18763: 18761: 18753: 18701: 18637: 18635: 18627: 18578: 18509: 18507: 18439: 18405: 18403: 18335: 18333: 18265: 18231: 18173: 18171: 18103: 18069: 18067: 17999: 17997: 17929: 17895: 17837: 17835: 17688: 17641: 17639: 17480: 17478: 17396: 17349: 17318: 17260: 17217: 17159: 17097: 17047: 17041: 16969: 16963: 16915: 16909: 16834: 16828: 16766: 16760: 16709: 16646: 16584: 16558: 16526: 16455: 16435: 16409: 16378: 16313: 16293: 16279: 16237: 16202: 16176: 16153: 16127: 16107: 16087: 16073: 16034: 16003: 15998: 15911: 15906: 15817: 15811: 15776: 15750: 15703: 15669: 15663: 15590: 15566: 15542: 15530:algebraic formulas 15518:{\displaystyle n!} 15515: 15492: 15446: 15420: 15366: 15179: 15161: 15127: 15084: 15029: 15023: 14953: 14829: 14680: 14393:, then a basis of 14367:invariant subspace 14220: 14218: 14043: 14041: 13878: 13730: 13654: 13594:General definition 13561: 13480: 13415: 13413: 13363: 13247:{\textstyle M_{j}} 13244: 13217: 13179: 13114: 13020: 13006: 12960: 12946: 12867: 12811: 12652: 12643: 12516: 12507: 12448: 12386: 12271: 12176: 12167: 12063: 12054: 11995: 11936: 11831: 11736: 11727: 11634: 11607: 11554: 11540: 11463: 11449: 11366: 11357: 11294: 11244: 11183: 11174: 11111: 11061: 10998: 10967: 10935: 10886: 10877: 10835: 10799: 10741: 10700: 10680: 10678: 10627: 10523:, whose roots are 10507: 10498: 10405: 10391: 10347: 10333: 10287: 10273: 10225: 10223: 10090: 10001: 9932: 9815: 9806: 9690:Thus, the vectors 9667: 9661: 9632: 9544: 9542: 9442: 9413: 9373: 9249: 9243: 9211: 9120: 9069: 9063: 9034: 8994: 8875: 8873: 8787: 8731: 8689: 8574: 8565: 8520: 8484: 8478: 8477: 8408: 8386: 8320: 8286:Jordan normal form 8278:Jordan normal form 8165:eigendecomposition 8147: 8092: 8033: 7978: 7969: 7832: 7823: 7655: 7635: 7615: 7586: 7557: 7529: 7463: 7443: 7419: 7399: 7373: 7353: 7331: 7292: 7262: 7217: 7197: 7143: 7073: 7044: 7024: 6960: 6931: 6903: 6839: 6819: 6793: 6741: 6715: 6692: 6645: 6618: 6587: 6567: 6537: 6510: 6450: 6420: 6393: 6370: 6355: 6331: 6314: 6294: 6267: 6247: 6223: 6119: 6091: 5938: 5910: 5867: 5824: 5778: 5752: 5723: 5703: 5668: 5648: 5628: 5596: 5567: 5543: 5510: 5490: 5466: 5464: 5341: 5321: 5278: 5251: 5205: 5179: 5156: 5098: 5078: 5033:contains a factor 5023: 4985: 4965: 4903: 4874: 4855:. In other words, 4845: 4825: 4805: 4743: 4717: 4671: 4632: 4612: 4592: 4550: 4514: 4494: 4444: 4373: 4337: 4277: 4200: 4084: 3892:belong to the set 3863: 3748: 3669:to be all vectors 3537: 3535: 3364: 3027:complex conjugates 3004:irrational numbers 2985: 2976: 2925: 2862: 2791: 2754: 2653: 2644: 2536: 2297: 2162: 2041: 1991:If it occurs that 1979: 1818: 1812: 1748: 1687: 1498: 1443: 1405: 1367:of each other, or 1351: 1342: 1298: 1286: 1231: 1185:Vera Kublanovskaya 1181:John G. F. Francis 1150:integral operators 1139:Poisson's equation 1131:Laplace's equation 1110:defective matrices 1082:Francesco Brioschi 1075:Hermitian matrices 1067:symmetric matrices 888: 825: 754: 752: 708: 699: 651: 587:facial recognition 579:vibration analysis 575:stability analysis 481: 437: 403: 381: 356: 333:{\displaystyle n.} 330: 307: 281: 203: 171: 135: 111: 91: 25427: 25426: 25026:Harmonic analysis 24813: 24812: 24680:Geometric algebra 24637:Kronecker product 24472:Linear projection 24457:Vector projection 24273: 24272: 24265: 24133:"λ – Eigenvalues" 23931:(16): 2309–2311. 23783:978-0-387-72828-5 23723:978-0-89871-454-8 23579:Topics In Algebra 23505:(13): 1473–1477, 23488:978-0-8018-5414-9 23312:10.1090/bull/1722 22975:, p. 165901. 22681:Press et al. 2007 22447:Press et al. 2007 22278:{\displaystyle n} 22047:Normal eigenvalue 21952:covariance matrix 21300: 21299: 21292: 21222:quantum chemistry 21210:Koopmans' theorem 21186:molecular physics 21178:quantum mechanics 20989:disordered system 20922:{\displaystyle H} 20857:{\displaystyle H} 20837:{\displaystyle E} 20817:{\displaystyle H} 20648:{\displaystyle H} 20594:square integrable 20547:{\displaystyle E} 20488:{\displaystyle H} 20420:quantum mechanics 20407:{\displaystyle T} 20114: 20096: 20066:{\displaystyle k} 20047:angular frequency 19942:{\displaystyle k} 19918:{\displaystyle m} 19898:{\displaystyle n} 19875:{\displaystyle x} 19835: 19788: 19675:{\displaystyle k} 19655:{\displaystyle k} 19635:{\displaystyle k} 19610: 19564:{\displaystyle i} 19449:{\displaystyle D} 19319:{\displaystyle A} 19222:covariance matrix 19152:covariance matrix 18958: 18957: 17237: 17074: 16619:Lanczos algorithm 16524: 16458:{\displaystyle A} 16316:{\displaystyle b} 16289: 16179:{\displaystyle A} 16130:{\displaystyle A} 16110:{\displaystyle a} 16083: 15602:numerical methods 15593:{\displaystyle n} 15569:{\displaystyle n} 15545:{\displaystyle n} 15423:{\displaystyle A} 15342: 15303: 15238: 14902: 14893: 14556:Dynamic equations 13760:, and the scalar 13754: 13753: 13583:) is a constant. 13445: 13412: 13212: 13164: 13105: 13016: 12956: 12382: 12087:triangular matrix 11654:diagonal matrices 11564:with eigenvalues 11550: 11459: 10703:{\displaystyle i} 10674: 10670: 10656: 10604: 10600: 10586: 10401: 10343: 10283: 9683:corresponding to 9263:corresponding to 8377: 8350: 8323:{\displaystyle H} 8229:. Each column of 7658:{\displaystyle A} 7638:{\displaystyle A} 7611: 7582: 7560:{\displaystyle A} 7522: 7502: 7488: 7446:{\displaystyle A} 7422:{\displaystyle u} 7376:{\displaystyle u} 7295:{\displaystyle A} 7220:{\displaystyle A} 7171:right eigenvector 7047:{\displaystyle P} 6842:{\displaystyle I} 6718:{\displaystyle A} 6648:{\displaystyle A} 6630:positive-definite 6621:{\displaystyle A} 6590:{\displaystyle A} 6540:{\displaystyle A} 6508: 6482: 6423:{\displaystyle A} 6396:{\displaystyle A} 6317:{\displaystyle k} 6270:{\displaystyle A} 6250:{\displaystyle k} 6122:{\displaystyle A} 5941:{\displaystyle A} 5755:{\displaystyle A} 5726:{\displaystyle A} 5671:{\displaystyle A} 5651:{\displaystyle n} 5570:{\displaystyle A} 5513:{\displaystyle A} 5493:{\displaystyle A} 5344:{\displaystyle A} 5182:{\displaystyle A} 4988:{\displaystyle D} 4848:{\displaystyle V} 4828:{\displaystyle I} 4635:{\displaystyle V} 4615:{\displaystyle A} 4517:{\displaystyle V} 3578:simple eigenvalue 3137:Suppose a matrix 3134:that polynomial. 3020:algebraic numbers 2560: 2559: 2321: 2320: 2186: 2185: 2065: 2064: 1441: 1297: 1169:Richard von Mises 1115:In the meantime, 959:of the domain of 788: 751: 245:quantum mechanics 114:{\displaystyle T} 25467: 25440:Abstract algebra 25415: 25414: 25403: 25402: 25391: 25390: 25380: 25379: 25311:Computer algebra 25286:Computer science 25006:Complex analysis 24840: 24833: 24826: 24817: 24816: 24803: 24802: 24685:Exterior algebra 24622:Hadamard product 24539: 24527:Linear equations 24398: 24391: 24384: 24375: 24374: 24340: 24331: 24329: 24328: 24323: 24268: 24261: 24257: 24254: 24248: 24216: 24215: 24208: 24198: 24180: 24162: 24160: 24148: 24127: 24118: 24092: 24073: 24071: 24046: 24044: 24032: 24030: 24028: 24012: 24010: 24008: 23992: 23990: 23988: 23972: 23915: 23913: 23900: 23891: 23855: 23837: 23811: 23786: 23768: 23746: 23726: 23708: 23687: 23667: 23643:Korn, Theresa M. 23637: 23609: 23591: 23573: 23562: 23551: 23550: 23529: 23491: 23466: 23448: 23447: 23426: 23425: 23402: 23380: 23363: 23330: 23328: 23305: 23287: 23277: 23266: 23255: 23235: 23226: 23184: 23159: 23148: 23133: 23122: 23100: 23079: 23073: 23067: 23061: 23055: 23049: 23043: 23037: 23031: 23030: 23018: 23012: 23006: 23000: 22994: 22988: 22982: 22976: 22970: 22964: 22963:, p. 15005. 22958: 22949: 22943: 22937: 22931: 22918: 22912: 22906: 22900: 22894: 22881: 22875: 22869: 22863: 22857: 22851: 22845: 22839: 22836:Van Mieghem 2024 22833: 22827: 22824:Van Mieghem 2014 22821: 22815: 22809: 22800: 22794: 22788: 22782: 22776: 22770: 22764: 22758: 22752: 22746: 22740: 22734: 22725: 22719: 22713: 22707: 22696: 22690: 22684: 22678: 22672: 22656: 22650: 22641: 22635: 22629: 22623: 22617: 22611: 22605: 22599: 22593: 22587: 22581: 22575: 22569: 22563: 22557: 22551: 22545: 22539: 22533: 22524: 22518: 22512: 22506: 22493: 22487: 22481: 22475: 22462: 22456: 22450: 22444: 22438: 22437: 22435: 22433: 22419: 22410: 22404: 22398: 22392: 22383: 22377: 22368: 22367: 22365: 22354: 22348: 22342: 22326: 22320: 22318: 22317: 22312: 22307: 22306: 22284: 22282: 22281: 22276: 22255: 22249: 22227: 22221: 22211: 22201: 22180: 22174: 22149: 22143: 22091:, pp. 176–227. 22078: 21978:data compression 21940:image processing 21912: 21910: 21909: 21904: 21902: 21901: 21885: 21883: 21882: 21877: 21875: 21874: 21858: 21856: 21855: 21850: 21848: 21847: 21831: 21829: 21828: 21823: 21821: 21820: 21804: 21802: 21801: 21796: 21794: 21793: 21763: 21761: 21760: 21755: 21753: 21752: 21740: 21739: 21727: 21726: 21710: 21708: 21707: 21702: 21700: 21699: 21687: 21686: 21674: 21673: 21657: 21655: 21654: 21649: 21647: 21646: 21634: 21633: 21621: 21620: 21604: 21602: 21601: 21596: 21594: 21593: 21577: 21575: 21574: 21569: 21567: 21566: 21550: 21548: 21547: 21542: 21540: 21539: 21515: 21513: 21512: 21507: 21505: 21504: 21499: 21486: 21484: 21483: 21478: 21476: 21475: 21470: 21457: 21455: 21454: 21449: 21447: 21446: 21441: 21428: 21426: 21425: 21420: 21418: 21417: 21405: 21404: 21392: 21391: 21375: 21373: 21372: 21367: 21365: 21364: 21359: 21350: 21349: 21344: 21335: 21334: 21329: 21295: 21288: 21284: 21281: 21275: 21255: 21254: 21247: 21167: 21165: 21164: 21159: 21151: 21150: 21134: 21132: 21131: 21126: 21118: 21117: 21100: 21098: 21097: 21092: 21090: 21085: 21084: 21079: 21066: 21064: 21063: 21058: 21046: 21044: 21043: 21038: 21036: 21031: 21030: 21025: 21012: 21010: 21009: 21004: 21002: 20963: 20961: 20960: 20955: 20950: 20949: 20940: 20928: 20926: 20925: 20920: 20908: 20906: 20905: 20900: 20895: 20894: 20885: 20863: 20861: 20860: 20855: 20843: 20841: 20840: 20835: 20823: 20821: 20820: 20815: 20799: 20797: 20796: 20791: 20786: 20785: 20776: 20761: 20759: 20758: 20753: 20748: 20747: 20738: 20724: 20723: 20714: 20696: 20694: 20693: 20688: 20683: 20682: 20673: 20660:bra–ket notation 20654: 20652: 20651: 20646: 20634: 20632: 20631: 20626: 20624: 20623: 20591: 20589: 20588: 20583: 20581: 20580: 20553: 20551: 20550: 20545: 20529: 20527: 20526: 20521: 20519: 20518: 20494: 20492: 20491: 20486: 20471: 20469: 20468: 20463: 20460: 20459: 20444: 20443: 20413: 20411: 20410: 20405: 20372:angular momentum 20369: 20367: 20366: 20361: 20209: 20207: 20206: 20201: 20190: 20186: 20167: 20166: 20141: 20139: 20138: 20133: 20116: 20115: 20107: 20098: 20097: 20089: 20075:damped vibration 20072: 20070: 20069: 20064: 20049:. The principal 20044: 20042: 20041: 20036: 20024: 20022: 20021: 20016: 20014: 20013: 19997: 19995: 19994: 19989: 19981: 19980: 19951:stiffness matrix 19948: 19946: 19945: 19940: 19924: 19922: 19921: 19916: 19904: 19902: 19901: 19896: 19881: 19879: 19878: 19873: 19859: 19857: 19856: 19851: 19837: 19836: 19828: 19815: 19813: 19812: 19807: 19790: 19789: 19781: 19767:eigenfrequencies 19699:adjacency matrix 19681: 19679: 19678: 19673: 19661: 19659: 19658: 19653: 19641: 19639: 19638: 19633: 19621: 19619: 19618: 19613: 19611: 19606: 19605: 19587: 19585: 19570: 19568: 19567: 19562: 19550: 19548: 19547: 19542: 19540: 19539: 19535: 19512: 19510: 19509: 19504: 19502: 19501: 19485: 19483: 19482: 19477: 19475: 19474: 19455: 19453: 19452: 19447: 19431: 19429: 19428: 19423: 19421: 19420: 19416: 19397: 19396: 19392: 19359: 19357: 19356: 19351: 19328:Laplacian matrix 19325: 19323: 19322: 19317: 19305:adjacency matrix 19242:orthogonal basis 19218:linear relations 19199:orthogonal basis 19149: 19147: 19146: 19141: 19117: 19115: 19114: 19109: 19062: 19060: 19059: 19054: 19021: 19017: 19015: 19014: 19009: 19007: 19006: 18954: 18952: 18951: 18946: 18944: 18940: 18939: 18904: 18903: 18898: 18888: 18887: 18855: 18854: 18849: 18831: 18829: 18828: 18823: 18821: 18820: 18792: 18791: 18786: 18772: 18770: 18769: 18764: 18762: 18758: 18757: 18722: 18721: 18716: 18706: 18705: 18670: 18669: 18664: 18646: 18644: 18643: 18638: 18636: 18632: 18631: 18599: 18598: 18593: 18583: 18582: 18550: 18549: 18544: 18518: 18516: 18515: 18510: 18508: 18494: 18493: 18470: 18469: 18448: 18446: 18445: 18440: 18432: 18431: 18414: 18412: 18411: 18406: 18404: 18390: 18389: 18366: 18365: 18344: 18342: 18341: 18336: 18334: 18320: 18319: 18296: 18295: 18274: 18272: 18271: 18266: 18258: 18257: 18240: 18238: 18237: 18232: 18227: 18226: 18208: 18207: 18190: 18182: 18180: 18179: 18174: 18172: 18158: 18157: 18134: 18133: 18112: 18110: 18109: 18104: 18096: 18095: 18078: 18076: 18075: 18070: 18068: 18054: 18053: 18030: 18029: 18008: 18006: 18005: 18000: 17998: 17984: 17983: 17960: 17959: 17938: 17936: 17935: 17930: 17922: 17921: 17904: 17902: 17901: 17896: 17891: 17890: 17872: 17871: 17854: 17846: 17844: 17843: 17838: 17836: 17805: 17801: 17800: 17781: 17780: 17740: 17736: 17735: 17719: 17718: 17697: 17695: 17694: 17689: 17681: 17680: 17668: 17667: 17650: 17648: 17647: 17642: 17640: 17606: 17602: 17601: 17579: 17578: 17535: 17531: 17530: 17511: 17510: 17489: 17487: 17486: 17481: 17479: 17475: 17474: 17458: 17457: 17444: 17443: 17427: 17426: 17405: 17403: 17402: 17397: 17389: 17388: 17376: 17375: 17358: 17356: 17355: 17350: 17348: 17347: 17327: 17325: 17324: 17319: 17287: 17286: 17269: 17267: 17266: 17261: 17259: 17258: 17235: 17226: 17224: 17223: 17218: 17186: 17185: 17168: 17166: 17165: 17160: 17155: 17154: 17133: 17132: 17106: 17104: 17103: 17098: 17096: 17095: 17072: 17056: 17054: 17053: 17048: 17046: 17045: 16978: 16976: 16975: 16970: 16968: 16967: 16924: 16922: 16921: 16916: 16914: 16913: 16843: 16841: 16840: 16835: 16833: 16832: 16825: 16824: 16801: 16800: 16775: 16773: 16772: 16767: 16765: 16764: 16716: 16700: 16693: 16686: 16668:Horizontal shear 16659:Unequal scaling 16649: 16645: 16623:iterative method 16593: 16591: 16590: 16585: 16583: 16567: 16565: 16564: 16559: 16557: 16556: 16551: 16535: 16533: 16532: 16527: 16525: 16523: 16522: 16517: 16516: 16511: 16504: 16503: 16495: 16494: 16489: 16482: 16464: 16462: 16461: 16456: 16444: 16442: 16441: 16436: 16434: 16420: 16418: 16416: 16415: 16410: 16408: 16389: 16387: 16385: 16384: 16379: 16377: 16376: 16322: 16320: 16319: 16314: 16302: 16300: 16299: 16294: 16292: 16291: 16290: 16284: 16283: 16246: 16244: 16243: 16238: 16211: 16209: 16208: 16203: 16185: 16183: 16182: 16177: 16162: 16160: 16159: 16154: 16137:with eigenvalue 16136: 16134: 16133: 16128: 16116: 16114: 16113: 16108: 16096: 16094: 16093: 16088: 16086: 16085: 16084: 16078: 16077: 16043: 16041: 16040: 16035: 16012: 16010: 16009: 16004: 16002: 15999: 15927: 15923: 15920: 15918: 15917: 15912: 15910: 15907: 15831:linear equations 15826: 15824: 15823: 15818: 15816: 15815: 15781: 15780: 15755: 15754: 15712: 15710: 15709: 15704: 15678: 15676: 15675: 15670: 15668: 15667: 15599: 15597: 15596: 15591: 15578:companion matrix 15575: 15573: 15572: 15567: 15551: 15549: 15548: 15543: 15524: 15522: 15521: 15516: 15501: 15499: 15498: 15493: 15466:round-off errors 15455: 15453: 15452: 15447: 15429: 15427: 15426: 15421: 15394:Classical method 15375: 15373: 15372: 15367: 15356: 15355: 15343: 15341: 15333: 15325: 15323: 15322: 15304: 15302: 15301: 15300: 15281: 15277: 15276: 15260: 15258: 15257: 15239: 15237: 15236: 15235: 15222: 15218: 15217: 15207: 15188: 15186: 15185: 15180: 15174: 15169: 15160: 15159: 15140: 15135: 15126: 15125: 15113: 15112: 15093: 15091: 15090: 15085: 15080: 15079: 15059: 15058: 15038: 15036: 15035: 15030: 15028: 15027: 15020: 15019: 14991: 14990: 14962: 14960: 14959: 14954: 14949: 14948: 14924: 14923: 14900: 14891: 14887: 14886: 14868: 14867: 14838: 14836: 14835: 14830: 14819: 14818: 14803: 14802: 14778: 14777: 14762: 14761: 14749: 14748: 14733: 14732: 14720: 14719: 14689: 14687: 14686: 14681: 14676: 14675: 14660: 14659: 14641: 14640: 14625: 14624: 14612: 14611: 14596: 14595: 14583: 14582: 14546:Hecke eigensheaf 14279:associated with 14248:associated with 14229: 14227: 14226: 14221: 14219: 14209: 14185: 14161: 14153: 14132: 14124: 14075:. Therefore, if 14052: 14050: 14049: 14044: 14042: 14032: 14008: 13984: 13967: 13946: 13938: 13887: 13885: 13884: 13879: 13874: 13870: 13869: 13855: 13841: 13748: 13739: 13737: 13736: 13731: 13726: 13712: 13693: 13663: 13661: 13660: 13655: 13570: 13568: 13567: 13562: 13557: 13556: 13489: 13487: 13486: 13481: 13446: 13444: 13433: 13424: 13422: 13421: 13416: 13414: 13411: 13400: 13372: 13370: 13369: 13364: 13253: 13251: 13250: 13245: 13243: 13242: 13226: 13224: 13223: 13218: 13213: 13211: 13210: 13206: 13205: 13193: 13192: 13178: 13162: 13161: 13154: 13153: 13141: 13140: 13128: 13127: 13113: 13103: 13098: 13097: 13092: 13086: 13085: 13070: 13049:Hermitian matrix 13029: 13027: 13026: 13021: 13019: 13018: 13017: 13011: 13010: 12969: 12967: 12966: 12961: 12959: 12958: 12957: 12951: 12950: 12876: 12874: 12873: 12868: 12863: 12862: 12841: 12840: 12816: 12815: 12661: 12659: 12658: 12653: 12648: 12647: 12525: 12523: 12522: 12517: 12512: 12511: 12476: 12475: 12474: 12473: 12463: 12453: 12452: 12414: 12413: 12412: 12411: 12401: 12391: 12390: 12383: 12375: 12345: 12344: 12343: 12342: 12332: 12312: 12302: 12292: 12280: 12278: 12277: 12272: 12185: 12183: 12182: 12177: 12172: 12171: 12072: 12070: 12069: 12064: 12059: 12058: 12023: 12022: 12021: 12020: 12010: 12000: 11999: 11964: 11963: 11962: 11961: 11951: 11941: 11940: 11905: 11904: 11903: 11902: 11892: 11872: 11862: 11852: 11840: 11838: 11837: 11832: 11745: 11743: 11742: 11737: 11732: 11731: 11643: 11641: 11640: 11635: 11629: 11624: 11623: 11622: 11612: 11603: 11602: 11601: 11600: 11590: 11563: 11561: 11560: 11555: 11553: 11552: 11551: 11545: 11544: 11537: 11536: 11525: 11524: 11498: 11497: 11496: 11495: 11485: 11472: 11470: 11469: 11464: 11462: 11461: 11460: 11454: 11453: 11446: 11445: 11434: 11433: 11407: 11406: 11405: 11404: 11394: 11375: 11373: 11372: 11367: 11362: 11361: 11354: 11353: 11340: 11339: 11312: 11311: 11299: 11298: 11284: 11283: 11270: 11269: 11249: 11248: 11241: 11240: 11227: 11226: 11192: 11190: 11189: 11184: 11179: 11178: 11171: 11170: 11157: 11156: 11129: 11128: 11116: 11115: 11101: 11100: 11087: 11086: 11066: 11065: 11058: 11057: 11044: 11043: 11007: 11005: 11004: 10999: 10994: 10993: 10980: 10975: 10962: 10961: 10948: 10943: 10924: 10923: 10914: 10913: 10895: 10893: 10892: 10887: 10882: 10881: 10840: 10839: 10804: 10803: 10752: 10750: 10748: 10747: 10742: 10731: 10730: 10709: 10707: 10706: 10701: 10689: 10687: 10686: 10681: 10679: 10675: 10666: 10665: 10657: 10649: 10640: 10635: 10619: 10618: 10605: 10596: 10595: 10587: 10579: 10567: 10566: 10543: 10542: 10516: 10514: 10513: 10508: 10503: 10502: 10416: 10414: 10412: 10411: 10406: 10404: 10403: 10402: 10396: 10395: 10358: 10356: 10354: 10353: 10348: 10346: 10345: 10344: 10338: 10337: 10298: 10296: 10294: 10293: 10288: 10286: 10285: 10284: 10278: 10277: 10234: 10232: 10231: 10226: 10224: 10205: 10204: 10189: 10188: 10173: 10172: 10130: 10129: 10102: 10095: 10094: 10011: 10007: 10006: 10005: 9937: 9936: 9824: 9822: 9821: 9816: 9811: 9810: 9728:, respectively. 9727: 9720: 9676: 9674: 9673: 9668: 9666: 9665: 9637: 9636: 9629: 9628: 9615: 9614: 9594: 9593: 9582: 9553: 9551: 9550: 9545: 9543: 9529: 9528: 9513: 9512: 9483: 9482: 9467: 9466: 9447: 9446: 9418: 9417: 9410: 9409: 9396: 9395: 9378: 9377: 9329: 9328: 9317: 9276: 9258: 9256: 9255: 9250: 9248: 9247: 9216: 9215: 9208: 9207: 9191: 9190: 9170: 9169: 9158: 9129: 9127: 9126: 9121: 9113: 9112: 9097: 9096: 9078: 9076: 9075: 9070: 9068: 9067: 9039: 9038: 9031: 9030: 9017: 9016: 8999: 8998: 8960: 8959: 8948: 8914: 8900: 8893: 8884: 8882: 8881: 8876: 8874: 8831: 8827: 8826: 8796: 8792: 8791: 8741: 8737: 8736: 8735: 8694: 8693: 8583: 8581: 8580: 8575: 8570: 8569: 8493: 8491: 8490: 8485: 8483: 8479: 8417: 8415: 8414: 8409: 8407: 8395: 8393: 8392: 8387: 8385: 8380: 8379: 8378: 8372: 8366: 8361: 8353: 8352: 8351: 8345: 8329: 8327: 8326: 8321: 8228: 8171:. Such a matrix 8156: 8154: 8153: 8148: 8131: 8130: 8101: 8099: 8098: 8093: 8088: 8087: 8042: 8040: 8039: 8034: 7987: 7985: 7984: 7979: 7974: 7973: 7966: 7965: 7960: 7954: 7953: 7937: 7936: 7931: 7925: 7924: 7913: 7912: 7907: 7901: 7900: 7841: 7839: 7838: 7833: 7828: 7827: 7820: 7819: 7814: 7801: 7800: 7795: 7787: 7786: 7781: 7664: 7662: 7661: 7656: 7644: 7642: 7641: 7636: 7624: 7622: 7621: 7616: 7614: 7613: 7612: 7595: 7593: 7592: 7587: 7585: 7584: 7583: 7566: 7564: 7563: 7558: 7538: 7536: 7535: 7530: 7525: 7524: 7523: 7517: 7505: 7504: 7503: 7497: 7491: 7490: 7489: 7472: 7470: 7469: 7464: 7452: 7450: 7449: 7444: 7431:left eigenvector 7428: 7426: 7425: 7420: 7408: 7406: 7405: 7400: 7382: 7380: 7379: 7374: 7363:is a scalar and 7362: 7360: 7359: 7354: 7340: 7338: 7337: 7332: 7327: 7313: 7301: 7299: 7298: 7293: 7282:multiply matrix 7271: 7269: 7268: 7263: 7258: 7247: 7226: 7224: 7223: 7218: 7206: 7204: 7203: 7198: 7152: 7150: 7149: 7144: 7136: 7135: 7108: 7107: 7082: 7080: 7079: 7074: 7053: 7051: 7050: 7045: 7033: 7031: 7030: 7025: 7014: 7013: 6989: 6988: 6969: 6967: 6966: 6961: 6940: 6938: 6937: 6932: 6930: 6912: 6910: 6909: 6904: 6893: 6892: 6868: 6867: 6848: 6846: 6845: 6840: 6828: 6826: 6825: 6820: 6802: 6800: 6799: 6794: 6789: 6788: 6770: 6769: 6750: 6748: 6747: 6742: 6724: 6722: 6721: 6716: 6701: 6699: 6698: 6693: 6685: 6680: 6679: 6670: 6654: 6652: 6651: 6646: 6627: 6625: 6624: 6619: 6596: 6594: 6593: 6588: 6576: 6574: 6573: 6568: 6566: 6565: 6547:is equal to its 6546: 6544: 6543: 6538: 6519: 6517: 6516: 6511: 6509: 6507: 6506: 6494: 6483: 6481: 6480: 6468: 6459: 6457: 6456: 6451: 6449: 6448: 6429: 6427: 6426: 6421: 6402: 6400: 6399: 6394: 6379: 6377: 6376: 6371: 6368: 6363: 6344: 6339: 6323: 6321: 6320: 6315: 6303: 6301: 6300: 6295: 6293: 6292: 6276: 6274: 6273: 6268: 6256: 6254: 6253: 6248: 6232: 6230: 6229: 6224: 6219: 6218: 6206: 6205: 6196: 6195: 6183: 6182: 6172: 6167: 6128: 6126: 6125: 6120: 6100: 6098: 6097: 6092: 6087: 6086: 6068: 6067: 6055: 6054: 6042: 6041: 6031: 6026: 6008: 6007: 5994: 5989: 5947: 5945: 5944: 5939: 5919: 5917: 5916: 5911: 5906: 5905: 5893: 5892: 5876: 5874: 5873: 5868: 5863: 5862: 5850: 5849: 5833: 5831: 5830: 5825: 5823: 5822: 5804: 5803: 5787: 5785: 5784: 5779: 5762:be an arbitrary 5761: 5759: 5758: 5753: 5732: 5730: 5729: 5724: 5712: 5710: 5709: 5704: 5702: 5701: 5696: 5677: 5675: 5674: 5669: 5657: 5655: 5654: 5649: 5637: 5635: 5634: 5629: 5627: 5626: 5621: 5605: 5603: 5602: 5597: 5595: 5594: 5589: 5576: 5574: 5573: 5568: 5552: 5550: 5549: 5544: 5536: 5535: 5519: 5517: 5516: 5511: 5499: 5497: 5496: 5491: 5475: 5473: 5472: 5467: 5465: 5452: 5451: 5422: 5421: 5409: 5408: 5398: 5393: 5371: 5370: 5350: 5348: 5347: 5342: 5330: 5328: 5327: 5322: 5317: 5316: 5304: 5303: 5287: 5285: 5284: 5279: 5277: 5276: 5260: 5258: 5257: 5252: 5250: 5249: 5231: 5230: 5214: 5212: 5211: 5206: 5188: 5186: 5185: 5180: 5165: 5163: 5162: 5157: 5146: 5145: 5124: 5123: 5107: 5105: 5104: 5099: 5087: 5085: 5084: 5079: 5077: 5076: 5066: 5065: 5032: 5030: 5029: 5024: 4994: 4992: 4991: 4986: 4974: 4972: 4971: 4966: 4912: 4910: 4909: 4904: 4883: 4881: 4880: 4875: 4854: 4852: 4851: 4846: 4834: 4832: 4831: 4826: 4814: 4812: 4811: 4806: 4752: 4750: 4749: 4744: 4726: 4724: 4723: 4718: 4716: 4715: 4705: 4704: 4680: 4678: 4677: 4672: 4664: 4663: 4641: 4639: 4638: 4633: 4621: 4619: 4618: 4613: 4601: 4599: 4598: 4593: 4582: 4581: 4559: 4557: 4556: 4551: 4540: 4539: 4523: 4521: 4520: 4515: 4503: 4501: 4500: 4495: 4493: 4492: 4487: 4475: 4474: 4469: 4453: 4451: 4450: 4445: 4443: 4442: 4432: 4431: 4421: 4404: 4403: 4398: 4382: 4380: 4379: 4374: 4363: 4362: 4346: 4344: 4343: 4338: 4327: 4326: 4305: 4304: 4286: 4284: 4283: 4278: 4261: 4260: 4239: 4238: 4209: 4207: 4206: 4201: 4154: 4153: 4093: 4091: 4090: 4085: 4074: 4073: 4047:associated with 4036:associated with 4012: 3988:or equivalently 3987: 3969: 3951: 3925:or equivalently 3924: 3909: 3872: 3870: 3869: 3864: 3862: 3861: 3856: 3824:associated with 3792:associated with 3776:associated with 3757: 3755: 3754: 3749: 3744: 3740: 3739: 3731: 3726: 3722: 3701: 3634:is said to be a 3576:is said to be a 3546: 3544: 3543: 3538: 3536: 3523: 3519: 3518: 3505: 3504: 3494: 3489: 3467: 3466: 3441: 3440: 3428: 3427: 3373: 3371: 3370: 3365: 3360: 3359: 3355: 3354: 3342: 3341: 3321: 3320: 3305: 3304: 3300: 3299: 3287: 3286: 3266: 3265: 3253: 3252: 3248: 3247: 3235: 3234: 3214: 3213: 3012:rational numbers 2994: 2992: 2991: 2986: 2981: 2980: 2952: 2951: 2940: 2930: 2929: 2898: 2897: 2886: 2873: 2871: 2869: 2868: 2863: 2861: 2853: 2848: 2844: 2819:in the equation 2810: 2806: 2800: 2798: 2797: 2792: 2787: 2786: 2759: 2758: 2676: 2662: 2660: 2659: 2654: 2649: 2648: 2554: 2545: 2543: 2542: 2537: 2523: 2522: 2498: 2497: 2476: 2475: 2431: 2391:secular equation 2385:) is called the 2315: 2306: 2304: 2303: 2298: 2261: 2249: 2199: 2195: 2191: 2180: 2171: 2169: 2168: 2163: 2158: 2150: 2145: 2141: 2115: 2102: 2084: 2080: 2072: 2059: 2050: 2048: 2047: 2042: 2037: 2026: 2018: 2002: 1998: 1994: 1988: 1986: 1985: 1980: 1975: 1974: 1965: 1964: 1951: 1946: 1928: 1927: 1918: 1917: 1896: 1895: 1886: 1885: 1870: 1869: 1860: 1859: 1844: 1843: 1827: 1825: 1824: 1819: 1817: 1816: 1809: 1808: 1788: 1787: 1774: 1773: 1753: 1752: 1745: 1744: 1724: 1723: 1710: 1709: 1692: 1691: 1684: 1683: 1664: 1663: 1649: 1648: 1610: 1609: 1590: 1589: 1578: 1577: 1564: 1563: 1544: 1543: 1532: 1531: 1507: 1505: 1504: 1499: 1494: 1486: 1471: 1467: 1463: 1459: 1452: 1450: 1449: 1444: 1442: 1434: 1414: 1412: 1411: 1406: 1401: 1390: 1378: 1365:scalar multiples 1360: 1358: 1357: 1352: 1347: 1346: 1305: 1299: 1295: 1291: 1290: 1252: 1240: 1236: 1197:Euclidean vector 1117:Joseph Liouville 1106:stability theory 1102:Karl Weierstrass 1020:quadric surfaces 910:—for example by 897: 895: 894: 889: 884: 873: 834: 832: 831: 826: 821: 820: 802: 801: 789: 787: 776: 763: 761: 760: 755: 753: 750: 739: 660: 658: 657: 652: 647: 633: 490: 488: 487: 482: 480: 469: 454: 450: 446: 444: 443: 438: 436: 420: 416: 412: 410: 409: 404: 402: 391:) simply scales 390: 388: 387: 382: 380: 365: 363: 362: 357: 355: 343: 339: 337: 336: 331: 316: 314: 313: 308: 306: 294: 290: 288: 287: 282: 277: 212: 210: 209: 204: 180: 178: 177: 172: 170: 159: 144: 142: 141: 136: 120: 118: 117: 112: 100: 98: 97: 92: 90: 63: 58: 57: 54: 53: 50: 47: 44: 25475: 25474: 25470: 25469: 25468: 25466: 25465: 25464: 25430: 25429: 25428: 25423: 25374: 25365: 25315: 25272: 25251:Systems science 25182: 25178:Homotopy theory 25144: 25111: 25063: 25035: 24982: 24929: 24900:Category theory 24886: 24851: 24844: 24814: 24809: 24791: 24753: 24709: 24646: 24598: 24540: 24531: 24497:Change of basis 24487:Multilinear map 24425: 24407: 24402: 24352: 24311: 24308: 24307: 24269: 24258: 24252: 24249: 24230: 24221:This article's 24217: 24213: 24206: 24201: 24196: 24178: 24158: 24130: 24090: 24081: 24079:Further reading 24076: 24042: 24026: 24024: 24022:Quanta Magazine 24006: 24004: 23986: 23984: 23853: 23784: 23766: 23724: 23705: 23704:978-007139880-0 23665: 23607: 23589: 23489: 23464: 23429: 23400: 23326: 23285: 23275: 23146: 23120: 23087: 23082: 23074: 23070: 23062: 23058: 23050: 23046: 23038: 23034: 23019: 23015: 23007: 23003: 22995: 22991: 22983: 22979: 22971: 22967: 22959: 22952: 22944: 22940: 22932: 22921: 22913: 22909: 22901: 22897: 22886:, p. 107; 22882: 22878: 22870: 22866: 22858: 22854: 22846: 22842: 22834: 22830: 22822: 22818: 22810: 22803: 22795: 22791: 22783: 22779: 22771: 22767: 22759: 22755: 22747: 22743: 22735: 22728: 22720: 22716: 22708: 22699: 22691: 22687: 22679: 22675: 22669:Wayback Machine 22657: 22653: 22642: 22638: 22630: 22626: 22618: 22614: 22606: 22602: 22594: 22590: 22582: 22578: 22570: 22566: 22558: 22554: 22546: 22542: 22534: 22527: 22519: 22515: 22507: 22496: 22488: 22484: 22476: 22465: 22457: 22453: 22445: 22441: 22431: 22429: 22421: 22420: 22413: 22407:Betteridge 1965 22405: 22401: 22393: 22386: 22378: 22371: 22363: 22355: 22351: 22343: 22339: 22335: 22330: 22329: 22302: 22298: 22290: 22287: 22286: 22270: 22267: 22266: 22256: 22252: 22228: 22224: 22181: 22177: 22150: 22146: 22079: 22075: 22070: 21998: 21936: 21919: 21897: 21893: 21891: 21888: 21887: 21870: 21866: 21864: 21861: 21860: 21843: 21839: 21837: 21834: 21833: 21816: 21812: 21810: 21807: 21806: 21789: 21785: 21783: 21780: 21779: 21776: 21770: 21748: 21744: 21735: 21731: 21722: 21718: 21716: 21713: 21712: 21695: 21691: 21682: 21678: 21669: 21665: 21663: 21660: 21659: 21642: 21638: 21629: 21625: 21616: 21612: 21610: 21607: 21606: 21589: 21585: 21583: 21580: 21579: 21562: 21558: 21556: 21553: 21552: 21535: 21531: 21529: 21526: 21525: 21500: 21495: 21494: 21492: 21489: 21488: 21471: 21466: 21465: 21463: 21460: 21459: 21442: 21437: 21436: 21434: 21431: 21430: 21413: 21409: 21400: 21396: 21387: 21383: 21381: 21378: 21377: 21360: 21355: 21354: 21345: 21340: 21339: 21330: 21325: 21324: 21322: 21319: 21318: 21296: 21285: 21279: 21276: 21268:help improve it 21265: 21256: 21252: 21245: 21174: 21146: 21142: 21140: 21137: 21136: 21113: 21109: 21107: 21104: 21103: 21086: 21080: 21075: 21074: 21072: 21069: 21068: 21052: 21049: 21048: 21032: 21026: 21021: 21020: 21018: 21015: 21014: 20998: 20996: 20993: 20992: 20970: 20945: 20941: 20936: 20934: 20931: 20930: 20914: 20911: 20910: 20890: 20886: 20881: 20876: 20873: 20872: 20849: 20846: 20845: 20829: 20826: 20825: 20809: 20806: 20805: 20781: 20777: 20772: 20770: 20767: 20766: 20743: 20739: 20734: 20719: 20715: 20710: 20705: 20702: 20701: 20678: 20674: 20669: 20667: 20664: 20663: 20640: 20637: 20636: 20619: 20615: 20613: 20610: 20609: 20576: 20572: 20570: 20567: 20566: 20539: 20536: 20535: 20514: 20510: 20508: 20505: 20504: 20480: 20477: 20476: 20455: 20451: 20439: 20435: 20430: 20427: 20426: 20399: 20396: 20395: 20378:for a position 20328: 20325: 20324: 20293: 20273:solid mechanics 20269: 20233: 20162: 20158: 20157: 20153: 20151: 20148: 20147: 20106: 20105: 20088: 20087: 20082: 20079: 20078: 20058: 20055: 20054: 20051:vibration modes 20030: 20027: 20026: 20009: 20005: 20003: 20000: 19999: 19976: 19972: 19961: 19958: 19957: 19934: 19931: 19930: 19910: 19907: 19906: 19890: 19887: 19886: 19867: 19864: 19863: 19827: 19826: 19821: 19818: 19817: 19780: 19779: 19774: 19771: 19770: 19755: 19741: 19720: 19667: 19664: 19663: 19647: 19644: 19643: 19627: 19624: 19623: 19601: 19597: 19586: 19581: 19576: 19573: 19572: 19556: 19553: 19552: 19531: 19524: 19520: 19518: 19515: 19514: 19497: 19493: 19491: 19488: 19487: 19467: 19463: 19461: 19458: 19457: 19441: 19438: 19437: 19412: 19405: 19401: 19388: 19381: 19377: 19369: 19366: 19365: 19339: 19336: 19335: 19311: 19308: 19307: 19293: 19281:factor analysis 19230:sample variance 19180: 19178:Factor analysis 19170: 19123: 19120: 19119: 19091: 19088: 19087: 19076: 19068:squeeze mapping 19027: 19024: 19023: 19019: 19002: 18998: 18972: 18969: 18968: 18942: 18941: 18934: 18933: 18924: 18923: 18913: 18912: 18905: 18899: 18894: 18893: 18890: 18889: 18882: 18881: 18875: 18874: 18864: 18863: 18856: 18850: 18845: 18844: 18840: 18838: 18835: 18834: 18815: 18814: 18808: 18807: 18797: 18796: 18787: 18782: 18781: 18779: 18776: 18775: 18760: 18759: 18752: 18751: 18742: 18741: 18731: 18730: 18723: 18717: 18712: 18711: 18708: 18707: 18700: 18699: 18690: 18689: 18679: 18678: 18671: 18665: 18660: 18659: 18655: 18653: 18650: 18649: 18634: 18633: 18626: 18625: 18619: 18618: 18608: 18607: 18600: 18594: 18589: 18588: 18585: 18584: 18577: 18576: 18570: 18569: 18559: 18558: 18551: 18545: 18540: 18539: 18535: 18533: 18530: 18529: 18506: 18505: 18495: 18489: 18485: 18482: 18481: 18471: 18465: 18461: 18457: 18455: 18452: 18451: 18427: 18423: 18421: 18418: 18417: 18402: 18401: 18391: 18385: 18381: 18378: 18377: 18367: 18361: 18357: 18353: 18351: 18348: 18347: 18332: 18331: 18321: 18315: 18311: 18308: 18307: 18297: 18291: 18287: 18283: 18281: 18278: 18277: 18253: 18249: 18247: 18244: 18243: 18222: 18218: 18203: 18199: 18197: 18194: 18193: 18192: 18170: 18169: 18159: 18153: 18149: 18146: 18145: 18135: 18129: 18125: 18121: 18119: 18116: 18115: 18091: 18087: 18085: 18082: 18081: 18066: 18065: 18055: 18049: 18045: 18042: 18041: 18031: 18025: 18021: 18017: 18015: 18012: 18011: 17996: 17995: 17985: 17979: 17975: 17972: 17971: 17961: 17955: 17951: 17947: 17945: 17942: 17941: 17917: 17913: 17911: 17908: 17907: 17886: 17882: 17867: 17863: 17861: 17858: 17857: 17856: 17834: 17833: 17803: 17802: 17793: 17789: 17782: 17776: 17772: 17769: 17768: 17738: 17737: 17731: 17727: 17720: 17714: 17710: 17706: 17704: 17701: 17700: 17676: 17672: 17663: 17659: 17657: 17654: 17653: 17638: 17637: 17604: 17603: 17591: 17587: 17580: 17574: 17570: 17567: 17566: 17533: 17532: 17523: 17519: 17512: 17506: 17502: 17498: 17496: 17493: 17492: 17477: 17476: 17470: 17466: 17459: 17453: 17449: 17446: 17445: 17439: 17435: 17428: 17422: 17418: 17414: 17412: 17409: 17408: 17384: 17380: 17371: 17367: 17365: 17362: 17361: 17343: 17339: 17337: 17334: 17333: 17282: 17278: 17276: 17273: 17272: 17254: 17250: 17233: 17230: 17229: 17181: 17177: 17175: 17172: 17171: 17150: 17146: 17128: 17124: 17113: 17110: 17109: 17091: 17087: 17070: 17067: 17066: 17062: 17040: 17039: 17028: 17016: 17015: 17004: 16988: 16987: 16985: 16982: 16981: 16962: 16961: 16956: 16950: 16949: 16944: 16934: 16933: 16931: 16928: 16927: 16908: 16907: 16896: 16884: 16883: 16869: 16853: 16852: 16850: 16847: 16846: 16827: 16826: 16820: 16816: 16814: 16808: 16807: 16802: 16796: 16792: 16785: 16784: 16782: 16779: 16778: 16759: 16758: 16753: 16747: 16746: 16741: 16731: 16730: 16728: 16725: 16724: 16640: 16635: 16615:sparse matrices 16600: 16579: 16577: 16574: 16573: 16552: 16547: 16546: 16544: 16541: 16540: 16518: 16512: 16507: 16506: 16505: 16499: 16490: 16485: 16484: 16483: 16481: 16473: 16470: 16469: 16450: 16447: 16446: 16430: 16428: 16425: 16424: 16404: 16396: 16393: 16392: 16391: 16369: 16365: 16348: 16345: 16344: 16343: 16335: 16333:Power iteration 16329: 16308: 16305: 16304: 16286: 16285: 16278: 16277: 16266: 16256: 16255: 16254: 16252: 16249: 16248: 16217: 16214: 16213: 16191: 16188: 16187: 16171: 16168: 16167: 16142: 16139: 16138: 16122: 16119: 16118: 16102: 16099: 16098: 16080: 16079: 16072: 16071: 16063: 16053: 16052: 16051: 16049: 16046: 16045: 16020: 16017: 16016: 15997: 15996: 15986: 15968: 15967: 15957: 15938: 15934: 15932: 15929: 15928: 15925: 15921: 15905: 15904: 15891: 15873: 15872: 15859: 15843: 15839: 15837: 15834: 15833: 15810: 15809: 15803: 15802: 15792: 15791: 15775: 15774: 15768: 15767: 15757: 15756: 15749: 15748: 15743: 15737: 15736: 15731: 15721: 15720: 15718: 15715: 15714: 15686: 15683: 15682: 15662: 15661: 15656: 15650: 15649: 15644: 15634: 15633: 15625: 15622: 15621: 15614: 15585: 15582: 15581: 15561: 15558: 15557: 15537: 15534: 15533: 15507: 15504: 15503: 15481: 15478: 15477: 15476:, which for an 15435: 15432: 15431: 15415: 15412: 15411: 15408: 15396: 15388: 15382: 15351: 15347: 15334: 15326: 15324: 15318: 15314: 15290: 15286: 15282: 15266: 15262: 15261: 15259: 15247: 15243: 15231: 15227: 15223: 15213: 15209: 15208: 15206: 15204: 15201: 15200: 15170: 15165: 15155: 15151: 15136: 15131: 15121: 15117: 15108: 15104: 15102: 15099: 15098: 15075: 15071: 15054: 15050: 15048: 15045: 15044: 15022: 15021: 15003: 14999: 14997: 14992: 14986: 14982: 14975: 14974: 14972: 14969: 14968: 14932: 14928: 14907: 14903: 14876: 14872: 14857: 14853: 14851: 14848: 14847: 14814: 14810: 14792: 14788: 14767: 14763: 14757: 14753: 14738: 14734: 14728: 14724: 14715: 14711: 14709: 14706: 14705: 14665: 14661: 14655: 14651: 14630: 14626: 14620: 14616: 14601: 14597: 14591: 14587: 14578: 14574: 14572: 14569: 14568: 14558: 14509: 14503: 14425: 14423:Spectral theory 14419: 14417:Spectral theory 14326: 14305: 14217: 14216: 14205: 14189: 14181: 14169: 14168: 14157: 14149: 14136: 14128: 14120: 14110: 14108: 14105: 14104: 14040: 14039: 14028: 14012: 14004: 13992: 13991: 13980: 13963: 13950: 13942: 13934: 13924: 13922: 13919: 13918: 13865: 13851: 13837: 13836: 13832: 13824: 13821: 13820: 13813: 13722: 13708: 13700: 13697: 13696: 13634: 13631: 13630: 13596: 13549: 13545: 13516: 13513: 13512: 13437: 13432: 13430: 13427: 13426: 13404: 13398: 13396: 13393: 13392: 13389: 13328: 13325: 13324: 13298:function spaces 13278: 13272: 13238: 13234: 13232: 13229: 13228: 13201: 13197: 13188: 13184: 13180: 13168: 13163: 13149: 13145: 13136: 13132: 13123: 13119: 13115: 13109: 13104: 13102: 13093: 13088: 13087: 13075: 13071: 13066: 13064: 13061: 13060: 13045: 13038: 13013: 13012: 13005: 13004: 12999: 12994: 12989: 12979: 12978: 12977: 12975: 12972: 12971: 12953: 12952: 12945: 12944: 12939: 12931: 12926: 12916: 12915: 12914: 12912: 12909: 12908: 12891: 12858: 12854: 12836: 12832: 12810: 12809: 12798: 12793: 12788: 12782: 12781: 12776: 12765: 12760: 12754: 12753: 12748: 12743: 12732: 12726: 12725: 12720: 12715: 12710: 12694: 12693: 12667: 12664: 12663: 12642: 12641: 12636: 12631: 12626: 12620: 12619: 12614: 12609: 12604: 12598: 12597: 12592: 12587: 12582: 12576: 12575: 12570: 12565: 12560: 12550: 12549: 12541: 12538: 12537: 12534: 12506: 12505: 12499: 12498: 12492: 12491: 12481: 12480: 12469: 12465: 12464: 12459: 12458: 12447: 12446: 12437: 12436: 12430: 12429: 12419: 12418: 12407: 12403: 12402: 12397: 12396: 12385: 12384: 12374: 12371: 12370: 12361: 12360: 12350: 12349: 12338: 12334: 12333: 12328: 12327: 12325: 12322: 12321: 12310: 12304: 12300: 12294: 12290: 12284: 12197: 12194: 12193: 12166: 12165: 12160: 12155: 12149: 12148: 12143: 12138: 12132: 12131: 12126: 12121: 12111: 12110: 12102: 12099: 12098: 12081: 12053: 12052: 12046: 12045: 12039: 12038: 12028: 12027: 12016: 12012: 12011: 12006: 12005: 11994: 11993: 11987: 11986: 11980: 11979: 11969: 11968: 11957: 11953: 11952: 11947: 11946: 11935: 11934: 11928: 11927: 11921: 11920: 11910: 11909: 11898: 11894: 11893: 11888: 11887: 11885: 11882: 11881: 11870: 11864: 11860: 11854: 11850: 11844: 11757: 11754: 11753: 11726: 11725: 11720: 11715: 11709: 11708: 11703: 11698: 11692: 11691: 11686: 11681: 11671: 11670: 11662: 11659: 11658: 11649: 11625: 11618: 11614: 11613: 11608: 11596: 11592: 11591: 11586: 11585: 11583: 11580: 11579: 11577: 11570: 11547: 11546: 11539: 11538: 11532: 11528: 11526: 11520: 11516: 11514: 11504: 11503: 11502: 11491: 11487: 11486: 11481: 11480: 11478: 11475: 11474: 11456: 11455: 11448: 11447: 11441: 11437: 11435: 11429: 11425: 11423: 11413: 11412: 11411: 11400: 11396: 11395: 11390: 11389: 11387: 11384: 11383: 11356: 11355: 11349: 11345: 11342: 11341: 11335: 11331: 11328: 11327: 11317: 11316: 11307: 11303: 11293: 11292: 11286: 11285: 11279: 11275: 11272: 11271: 11265: 11261: 11254: 11253: 11243: 11242: 11236: 11232: 11229: 11228: 11222: 11218: 11215: 11214: 11204: 11203: 11198: 11195: 11194: 11173: 11172: 11166: 11162: 11159: 11158: 11152: 11148: 11145: 11144: 11134: 11133: 11124: 11120: 11110: 11109: 11103: 11102: 11096: 11092: 11089: 11088: 11082: 11078: 11071: 11070: 11060: 11059: 11053: 11049: 11046: 11045: 11039: 11035: 11032: 11031: 11021: 11020: 11015: 11012: 11011: 10989: 10985: 10976: 10971: 10957: 10953: 10944: 10939: 10919: 10915: 10909: 10905: 10903: 10900: 10899: 10876: 10875: 10869: 10868: 10862: 10861: 10851: 10850: 10834: 10833: 10827: 10826: 10820: 10819: 10809: 10808: 10798: 10797: 10791: 10790: 10784: 10783: 10773: 10772: 10767: 10764: 10763: 10761: 10726: 10722: 10720: 10717: 10716: 10715: 10695: 10692: 10691: 10677: 10676: 10664: 10648: 10636: 10631: 10620: 10614: 10610: 10607: 10606: 10594: 10578: 10568: 10562: 10558: 10555: 10554: 10544: 10538: 10534: 10530: 10528: 10525: 10524: 10497: 10496: 10491: 10486: 10480: 10479: 10474: 10469: 10463: 10462: 10457: 10452: 10442: 10441: 10433: 10430: 10429: 10423: 10398: 10397: 10390: 10389: 10384: 10379: 10369: 10368: 10367: 10365: 10362: 10361: 10360: 10340: 10339: 10332: 10331: 10326: 10318: 10308: 10307: 10306: 10304: 10301: 10300: 10299: 10280: 10279: 10272: 10271: 10266: 10261: 10251: 10250: 10249: 10247: 10244: 10243: 10242: 10222: 10221: 10200: 10196: 10184: 10180: 10168: 10167: 10125: 10124: 10100: 10099: 10089: 10088: 10077: 10072: 10066: 10065: 10060: 10049: 10043: 10042: 10037: 10032: 10016: 10015: 10000: 9999: 9994: 9989: 9983: 9982: 9977: 9972: 9966: 9965: 9960: 9955: 9945: 9944: 9931: 9930: 9925: 9920: 9914: 9913: 9908: 9903: 9897: 9896: 9891: 9886: 9876: 9875: 9874: 9870: 9863: 9838: 9836: 9833: 9832: 9805: 9804: 9799: 9794: 9788: 9787: 9782: 9777: 9771: 9770: 9765: 9760: 9750: 9749: 9741: 9738: 9737: 9734: 9722: 9715: 9709: 9699: 9660: 9659: 9653: 9652: 9642: 9641: 9631: 9630: 9624: 9620: 9617: 9616: 9610: 9606: 9599: 9598: 9583: 9578: 9577: 9575: 9572: 9571: 9569: 9562: 9541: 9540: 9530: 9524: 9520: 9508: 9504: 9498: 9497: 9484: 9478: 9474: 9462: 9458: 9449: 9448: 9441: 9440: 9434: 9433: 9423: 9422: 9412: 9411: 9405: 9401: 9398: 9397: 9391: 9387: 9380: 9379: 9372: 9371: 9363: 9357: 9356: 9351: 9338: 9337: 9330: 9318: 9313: 9312: 9290: 9288: 9285: 9284: 9271: 9242: 9241: 9232: 9231: 9221: 9220: 9210: 9209: 9203: 9199: 9193: 9192: 9186: 9182: 9175: 9174: 9159: 9154: 9153: 9151: 9148: 9147: 9145: 9138: 9108: 9104: 9092: 9088: 9083: 9080: 9079: 9062: 9061: 9055: 9054: 9044: 9043: 9033: 9032: 9026: 9022: 9019: 9018: 9012: 9008: 9001: 9000: 8993: 8992: 8987: 8981: 8980: 8975: 8965: 8964: 8949: 8944: 8943: 8926: 8923: 8922: 8909: 8895: 8888: 8872: 8871: 8829: 8828: 8822: 8818: 8794: 8793: 8786: 8785: 8774: 8768: 8767: 8762: 8746: 8745: 8730: 8729: 8724: 8718: 8717: 8712: 8702: 8701: 8688: 8687: 8682: 8676: 8675: 8670: 8660: 8659: 8658: 8654: 8647: 8622: 8620: 8617: 8616: 8564: 8563: 8558: 8552: 8551: 8546: 8536: 8535: 8527: 8524: 8523: 8513: 8503: 8476: 8475: 8470: 8464: 8463: 8458: 8450: 8446: 8444: 8441: 8440: 8429: 8424: 8422:Matrix examples 8403: 8401: 8398: 8397: 8381: 8374: 8373: 8368: 8367: 8362: 8357: 8347: 8346: 8341: 8340: 8338: 8335: 8334: 8315: 8312: 8311: 8304: 8302:Min-max theorem 8298: 8220: 8123: 8119: 8117: 8114: 8113: 8080: 8076: 8062: 8059: 8058: 8013: 8010: 8009: 7996: 7968: 7967: 7961: 7956: 7955: 7949: 7945: 7943: 7938: 7932: 7927: 7926: 7920: 7916: 7914: 7908: 7903: 7902: 7896: 7892: 7885: 7884: 7873: 7870: 7869: 7822: 7821: 7815: 7810: 7809: 7807: 7802: 7796: 7791: 7790: 7788: 7782: 7777: 7776: 7769: 7768: 7760: 7757: 7756: 7736: 7727: 7720: 7713: 7704: 7697: 7677: 7671: 7650: 7647: 7646: 7630: 7627: 7626: 7608: 7607: 7603: 7601: 7598: 7597: 7579: 7578: 7574: 7572: 7569: 7568: 7552: 7549: 7548: 7519: 7518: 7513: 7512: 7499: 7498: 7493: 7492: 7485: 7484: 7480: 7478: 7475: 7474: 7458: 7455: 7454: 7438: 7435: 7434: 7414: 7411: 7410: 7388: 7385: 7384: 7368: 7365: 7364: 7348: 7345: 7344: 7323: 7309: 7307: 7304: 7303: 7287: 7284: 7283: 7254: 7243: 7238: 7235: 7234: 7212: 7209: 7208: 7186: 7183: 7182: 7181:multiplies the 7166: 7160: 7131: 7127: 7103: 7099: 7088: 7085: 7084: 7059: 7056: 7055: 7039: 7036: 7035: 7009: 7005: 6984: 6980: 6975: 6972: 6971: 6946: 6943: 6942: 6926: 6918: 6915: 6914: 6913:. Moreover, if 6888: 6884: 6863: 6859: 6854: 6851: 6850: 6834: 6831: 6830: 6808: 6805: 6804: 6784: 6780: 6765: 6761: 6756: 6753: 6752: 6730: 6727: 6726: 6710: 6707: 6706: 6681: 6675: 6671: 6666: 6664: 6661: 6660: 6640: 6637: 6636: 6613: 6610: 6609: 6582: 6579: 6578: 6561: 6557: 6555: 6552: 6551: 6532: 6529: 6528: 6502: 6498: 6493: 6476: 6472: 6467: 6465: 6462: 6461: 6441: 6437: 6435: 6432: 6431: 6415: 6412: 6411: 6388: 6385: 6384: 6364: 6359: 6340: 6335: 6329: 6326: 6325: 6309: 6306: 6305: 6288: 6284: 6282: 6279: 6278: 6262: 6259: 6258: 6242: 6239: 6238: 6214: 6210: 6201: 6197: 6191: 6187: 6178: 6174: 6168: 6157: 6136: 6133: 6132: 6114: 6111: 6110: 6082: 6078: 6063: 6059: 6050: 6046: 6037: 6033: 6027: 6016: 6000: 5996: 5990: 5979: 5955: 5952: 5951: 5933: 5930: 5929: 5901: 5897: 5888: 5884: 5882: 5879: 5878: 5858: 5854: 5845: 5841: 5839: 5836: 5835: 5818: 5814: 5799: 5795: 5793: 5790: 5789: 5767: 5764: 5763: 5747: 5744: 5743: 5740: 5718: 5715: 5714: 5697: 5692: 5691: 5689: 5686: 5685: 5663: 5660: 5659: 5643: 5640: 5639: 5622: 5617: 5616: 5614: 5611: 5610: 5590: 5585: 5584: 5582: 5579: 5578: 5562: 5559: 5558: 5531: 5527: 5525: 5522: 5521: 5505: 5502: 5501: 5485: 5482: 5481: 5463: 5462: 5447: 5443: 5436: 5430: 5429: 5417: 5413: 5404: 5400: 5394: 5383: 5372: 5366: 5362: 5358: 5356: 5353: 5352: 5336: 5333: 5332: 5312: 5308: 5299: 5295: 5293: 5290: 5289: 5272: 5268: 5266: 5263: 5262: 5245: 5241: 5226: 5222: 5220: 5217: 5216: 5194: 5191: 5190: 5174: 5171: 5170: 5141: 5137: 5119: 5115: 5113: 5110: 5109: 5093: 5090: 5089: 5061: 5057: 5056: 5052: 5038: 5035: 5034: 5000: 4997: 4996: 4995:, we know that 4980: 4977: 4976: 4918: 4915: 4914: 4889: 4886: 4885: 4860: 4857: 4856: 4840: 4837: 4836: 4820: 4817: 4816: 4758: 4755: 4754: 4732: 4729: 4728: 4700: 4696: 4695: 4691: 4686: 4683: 4682: 4659: 4655: 4647: 4644: 4643: 4627: 4624: 4623: 4607: 4604: 4603: 4577: 4573: 4565: 4562: 4561: 4535: 4531: 4529: 4526: 4525: 4509: 4506: 4505: 4488: 4483: 4482: 4470: 4465: 4464: 4459: 4456: 4455: 4427: 4423: 4422: 4417: 4416: 4399: 4394: 4393: 4391: 4388: 4387: 4358: 4354: 4352: 4349: 4348: 4322: 4318: 4300: 4296: 4294: 4291: 4290: 4256: 4252: 4234: 4230: 4222: 4219: 4218: 4149: 4145: 4143: 4140: 4139: 4069: 4065: 4063: 4060: 4059: 3989: 3975: 3961: 3926: 3911: 3897: 3857: 3852: 3851: 3849: 3846: 3845: 3838:linear subspace 3735: 3727: 3709: 3705: 3697: 3696: 3692: 3684: 3681: 3680: 3644: 3633: 3624: 3615: 3606: 3597: 3588: 3575: 3566: 3557: 3534: 3533: 3514: 3510: 3506: 3500: 3496: 3490: 3479: 3468: 3462: 3458: 3455: 3454: 3436: 3432: 3423: 3419: 3412: 3405: 3403: 3400: 3399: 3350: 3346: 3337: 3333: 3332: 3328: 3316: 3312: 3295: 3291: 3282: 3278: 3277: 3273: 3261: 3257: 3243: 3239: 3230: 3226: 3225: 3221: 3209: 3205: 3176: 3173: 3172: 3129: 3108: 3099: 3075: 3065: 3059:of the matrix. 3057:spectral radius 3044: 2975: 2974: 2968: 2967: 2957: 2956: 2941: 2936: 2935: 2924: 2923: 2914: 2913: 2903: 2902: 2887: 2882: 2881: 2879: 2876: 2875: 2857: 2849: 2831: 2827: 2825: 2822: 2821: 2820: 2808: 2804: 2782: 2778: 2753: 2752: 2741: 2735: 2734: 2729: 2713: 2712: 2686: 2683: 2682: 2666: 2643: 2642: 2637: 2631: 2630: 2625: 2615: 2614: 2606: 2603: 2602: 2593: 2584: 2577: 2570: 2518: 2514: 2493: 2489: 2471: 2467: 2438: 2435: 2434: 2268: 2265: 2264: 2239: 2219: 2213: 2201:identity matrix 2197: 2193: 2189: 2154: 2146: 2128: 2124: 2122: 2119: 2118: 2100: 2099:for the matrix 2082: 2078: 2068: 2033: 2022: 2014: 2009: 2006: 2005: 1996: 1992: 1970: 1966: 1957: 1953: 1947: 1936: 1923: 1919: 1910: 1906: 1891: 1887: 1878: 1874: 1865: 1861: 1852: 1848: 1839: 1835: 1833: 1830: 1829: 1811: 1810: 1804: 1800: 1797: 1796: 1790: 1789: 1783: 1779: 1776: 1775: 1769: 1765: 1758: 1757: 1747: 1746: 1740: 1736: 1733: 1732: 1726: 1725: 1719: 1715: 1712: 1711: 1705: 1701: 1694: 1693: 1686: 1685: 1676: 1672: 1670: 1665: 1656: 1652: 1650: 1641: 1637: 1634: 1633: 1628: 1623: 1618: 1612: 1611: 1602: 1598: 1596: 1591: 1585: 1581: 1579: 1573: 1569: 1566: 1565: 1556: 1552: 1550: 1545: 1539: 1535: 1533: 1527: 1523: 1516: 1515: 1513: 1510: 1509: 1490: 1482: 1477: 1474: 1473: 1469: 1465: 1461: 1457: 1433: 1422: 1419: 1418: 1397: 1386: 1384: 1381: 1380: 1376: 1341: 1340: 1331: 1330: 1324: 1323: 1310: 1309: 1301: 1293: 1285: 1284: 1278: 1277: 1268: 1267: 1257: 1256: 1248: 1246: 1243: 1242: 1238: 1234: 1203: 1193: 1071:Charles Hermite 986:quadratic forms 974: 880: 869: 864: 861: 860: 813: 809: 794: 790: 780: 775: 773: 770: 769: 743: 737: 735: 732: 731: 677:. For example, 643: 629: 621: 618: 617: 583:atomic orbitals 533: 503:square matrices 476: 465: 460: 457: 456: 452: 448: 432: 430: 427: 426: 418: 414: 413:by a factor of 398: 396: 393: 392: 376: 371: 368: 367: 351: 349: 346: 345: 341: 340:If multiplying 322: 319: 318: 302: 300: 297: 296: 292: 273: 268: 265: 264: 261: 255:of the system. 198: 195: 194: 166: 155: 150: 147: 146: 130: 127: 126: 106: 103: 102: 86: 84: 81: 80: 61: 41: 37: 24: 17: 12: 11: 5: 25473: 25463: 25462: 25457: 25452: 25447: 25445:Linear algebra 25442: 25425: 25424: 25422: 25421: 25409: 25397: 25385: 25370: 25367: 25366: 25364: 25363: 25358: 25353: 25348: 25343: 25338: 25337: 25336: 25329:Mathematicians 25325: 25323: 25321:Related topics 25317: 25316: 25314: 25313: 25308: 25303: 25298: 25293: 25288: 25282: 25280: 25274: 25273: 25271: 25270: 25269: 25268: 25263: 25258: 25256:Control theory 25248: 25243: 25238: 25233: 25228: 25223: 25218: 25213: 25208: 25203: 25198: 25192: 25190: 25184: 25183: 25181: 25180: 25175: 25170: 25165: 25160: 25154: 25152: 25146: 25145: 25143: 25142: 25137: 25132: 25127: 25121: 25119: 25113: 25112: 25110: 25109: 25104: 25099: 25094: 25089: 25084: 25079: 25073: 25071: 25065: 25064: 25062: 25061: 25056: 25051: 25045: 25043: 25037: 25036: 25034: 25033: 25031:Measure theory 25028: 25023: 25018: 25013: 25008: 25003: 24998: 24992: 24990: 24984: 24983: 24981: 24980: 24975: 24970: 24965: 24960: 24955: 24950: 24945: 24939: 24937: 24931: 24930: 24928: 24927: 24922: 24917: 24912: 24907: 24902: 24896: 24894: 24888: 24887: 24885: 24884: 24879: 24874: 24873: 24872: 24867: 24856: 24853: 24852: 24843: 24842: 24835: 24828: 24820: 24811: 24810: 24808: 24807: 24796: 24793: 24792: 24790: 24789: 24784: 24779: 24774: 24769: 24767:Floating-point 24763: 24761: 24755: 24754: 24752: 24751: 24749:Tensor product 24746: 24741: 24736: 24734:Function space 24731: 24726: 24720: 24718: 24711: 24710: 24708: 24707: 24702: 24697: 24692: 24687: 24682: 24677: 24672: 24670:Triple product 24667: 24662: 24656: 24654: 24648: 24647: 24645: 24644: 24639: 24634: 24629: 24624: 24619: 24614: 24608: 24606: 24600: 24599: 24597: 24596: 24591: 24586: 24584:Transformation 24581: 24576: 24574:Multiplication 24571: 24566: 24561: 24556: 24550: 24548: 24542: 24541: 24534: 24532: 24530: 24529: 24524: 24519: 24514: 24509: 24504: 24499: 24494: 24489: 24484: 24479: 24474: 24469: 24464: 24459: 24454: 24449: 24444: 24439: 24433: 24431: 24430:Basic concepts 24427: 24426: 24424: 24423: 24418: 24412: 24409: 24408: 24405:Linear algebra 24401: 24400: 24393: 24386: 24378: 24372: 24371: 24358: 24351: 24348: 24334: 24333: 24321: 24318: 24315: 24301: 24292: 24286: 24280: 24271: 24270: 24225:external links 24220: 24218: 24211: 24205: 24204:External links 24202: 24200: 24199: 24194: 24181: 24176: 24163: 24149: 24128: 24101:(1–2): 35–65, 24082: 24080: 24077: 24075: 24074: 24047: 24033: 24013: 23993: 23973: 23925:Optics Letters 23916: 23901: 23892: 23881:10.1086/626490 23867:(2): 114–150, 23856: 23851: 23843:Linear algebra 23838: 23787: 23782: 23769: 23765:978-0521880688 23764: 23747: 23727: 23722: 23709: 23703: 23688: 23679:(3): 637–657, 23668: 23663: 23638: 23610: 23605: 23592: 23588:978-1114541016 23587: 23574: 23569:Linear Algebra 23563: 23552: 23530: 23492: 23487: 23471:Golub, Gene H. 23467: 23462: 23454:Linear algebra 23449: 23438:(4): 332–345, 23427: 23416:(3): 265–271, 23403: 23398: 23390:Addison-Wesley 23381: 23346:(4): 365–382, 23331: 23278: 23273: 23256: 23236: 23227: 23175:(16): 165901. 23160: 23149: 23144: 23123: 23118: 23101: 23088: 23086: 23083: 23081: 23080: 23068: 23056: 23044: 23032: 23013: 23011:, p. 243. 23001: 22989: 22977: 22965: 22950: 22938: 22919: 22907: 22905:, p. 111. 22895: 22890:, p. 109 22876: 22864: 22852: 22840: 22828: 22816: 22801: 22797:Wolchover 2019 22789: 22787:, p. 116. 22777: 22775:, p. 290. 22765: 22753: 22751:, p. 272. 22741: 22739:, p. 307. 22726: 22714: 22712:, p. 316. 22697: 22695:, p. 358. 22685: 22673: 22651: 22636: 22624: 22612: 22600: 22588: 22576: 22564: 22562:, pp. 706–707. 22552: 22550:, pp. 715–716. 22540: 22538:, pp. 807–808. 22525: 22513: 22494: 22482: 22480:, p. 107. 22463: 22451: 22449:, p. 536. 22439: 22411: 22399: 22384: 22369: 22349: 22347:, p. 401. 22336: 22334: 22331: 22328: 22327: 22310: 22305: 22301: 22297: 22294: 22274: 22250: 22222: 22220: 22219: 22213: 22204:eigenfunctions 22175: 22156:Comptes rendus 22144: 22142: 22141: 22123: 22100: 22072: 22071: 22069: 22066: 22065: 22064: 22059: 22057:Singular value 22054: 22049: 22044: 22039: 22034: 22029: 22027:Quantum states 22024: 22019: 22014: 22009: 22004: 21997: 21994: 21982:identification 21932:Main article: 21918: 21915: 21900: 21896: 21873: 21869: 21846: 21842: 21819: 21815: 21792: 21788: 21772:Main article: 21769: 21766: 21751: 21747: 21743: 21738: 21734: 21730: 21725: 21721: 21698: 21694: 21690: 21685: 21681: 21677: 21672: 21668: 21645: 21641: 21637: 21632: 21628: 21624: 21619: 21615: 21592: 21588: 21565: 21561: 21538: 21534: 21503: 21498: 21474: 21469: 21445: 21440: 21416: 21412: 21408: 21403: 21399: 21395: 21390: 21386: 21363: 21358: 21353: 21348: 21343: 21338: 21333: 21328: 21298: 21297: 21259: 21257: 21250: 21244: 21241: 21173: 21170: 21157: 21154: 21149: 21145: 21124: 21121: 21116: 21112: 21089: 21083: 21078: 21056: 21035: 21029: 21024: 21001: 20977:acoustic waves 20969: 20968:Wave transport 20966: 20953: 20948: 20944: 20939: 20918: 20898: 20893: 20889: 20884: 20880: 20853: 20833: 20813: 20789: 20784: 20780: 20775: 20763: 20762: 20751: 20746: 20742: 20737: 20733: 20730: 20727: 20722: 20718: 20713: 20709: 20686: 20681: 20677: 20672: 20644: 20622: 20618: 20602:scalar product 20579: 20575: 20543: 20517: 20513: 20484: 20473: 20472: 20458: 20454: 20450: 20447: 20442: 20438: 20434: 20403: 20384:atomic nucleus 20359: 20355: 20352: 20348: 20345: 20341: 20338: 20335: 20332: 20292: 20289: 20268: 20265: 20261:center of mass 20245:principal axes 20232: 20229: 20199: 20196: 20193: 20189: 20185: 20182: 20179: 20176: 20173: 20170: 20165: 20161: 20156: 20131: 20128: 20125: 20122: 20119: 20113: 20110: 20104: 20101: 20095: 20092: 20086: 20077:, governed by 20062: 20034: 20012: 20008: 19987: 19984: 19979: 19975: 19971: 19968: 19965: 19938: 19914: 19894: 19871: 19849: 19846: 19843: 19840: 19834: 19831: 19825: 19805: 19802: 19799: 19796: 19793: 19787: 19784: 19778: 19751:Main article: 19740: 19737: 19719: 19716: 19671: 19662:th largest or 19651: 19631: 19609: 19604: 19600: 19596: 19593: 19590: 19584: 19580: 19560: 19538: 19534: 19530: 19527: 19523: 19500: 19496: 19473: 19470: 19466: 19445: 19419: 19415: 19411: 19408: 19404: 19400: 19395: 19391: 19387: 19384: 19380: 19376: 19373: 19349: 19346: 19343: 19315: 19292: 19289: 19257:bioinformatics 19166:Main article: 19139: 19136: 19133: 19130: 19127: 19107: 19104: 19101: 19098: 19095: 19075: 19072: 19052: 19049: 19046: 19043: 19040: 19037: 19034: 19031: 19005: 19001: 18997: 18994: 18991: 18988: 18985: 18982: 18979: 18976: 18956: 18955: 18938: 18932: 18929: 18926: 18925: 18922: 18919: 18918: 18916: 18911: 18908: 18906: 18902: 18897: 18892: 18891: 18886: 18880: 18877: 18876: 18873: 18870: 18869: 18867: 18862: 18859: 18857: 18853: 18848: 18843: 18842: 18832: 18819: 18813: 18810: 18809: 18806: 18803: 18802: 18800: 18795: 18790: 18785: 18773: 18756: 18750: 18747: 18744: 18743: 18740: 18737: 18736: 18734: 18729: 18726: 18724: 18720: 18715: 18710: 18709: 18704: 18698: 18695: 18692: 18691: 18688: 18685: 18684: 18682: 18677: 18674: 18672: 18668: 18663: 18658: 18657: 18647: 18630: 18624: 18621: 18620: 18617: 18614: 18613: 18611: 18606: 18603: 18601: 18597: 18592: 18587: 18586: 18581: 18575: 18572: 18571: 18568: 18565: 18564: 18562: 18557: 18554: 18552: 18548: 18543: 18538: 18537: 18527: 18524: 18520: 18519: 18504: 18501: 18498: 18496: 18492: 18488: 18484: 18483: 18480: 18477: 18474: 18472: 18468: 18464: 18460: 18459: 18449: 18438: 18435: 18430: 18426: 18415: 18400: 18397: 18394: 18392: 18388: 18384: 18380: 18379: 18376: 18373: 18370: 18368: 18364: 18360: 18356: 18355: 18345: 18330: 18327: 18324: 18322: 18318: 18314: 18310: 18309: 18306: 18303: 18300: 18298: 18294: 18290: 18286: 18285: 18275: 18264: 18261: 18256: 18252: 18241: 18230: 18225: 18221: 18217: 18214: 18211: 18206: 18202: 18184: 18183: 18168: 18165: 18162: 18160: 18156: 18152: 18148: 18147: 18144: 18141: 18138: 18136: 18132: 18128: 18124: 18123: 18113: 18102: 18099: 18094: 18090: 18079: 18064: 18061: 18058: 18056: 18052: 18048: 18044: 18043: 18040: 18037: 18034: 18032: 18028: 18024: 18020: 18019: 18009: 17994: 17991: 17988: 17986: 17982: 17978: 17974: 17973: 17970: 17967: 17964: 17962: 17958: 17954: 17950: 17949: 17939: 17928: 17925: 17920: 17916: 17905: 17894: 17889: 17885: 17881: 17878: 17875: 17870: 17866: 17848: 17847: 17832: 17829: 17826: 17823: 17820: 17817: 17814: 17811: 17808: 17806: 17804: 17799: 17796: 17792: 17788: 17785: 17783: 17779: 17775: 17771: 17770: 17767: 17764: 17761: 17758: 17755: 17752: 17749: 17746: 17743: 17741: 17739: 17734: 17730: 17726: 17723: 17721: 17717: 17713: 17709: 17708: 17698: 17687: 17684: 17679: 17675: 17671: 17666: 17662: 17651: 17636: 17633: 17630: 17627: 17624: 17621: 17618: 17615: 17612: 17609: 17607: 17605: 17600: 17597: 17594: 17590: 17586: 17583: 17581: 17577: 17573: 17569: 17568: 17565: 17562: 17559: 17556: 17553: 17550: 17547: 17544: 17541: 17538: 17536: 17534: 17529: 17526: 17522: 17518: 17515: 17513: 17509: 17505: 17501: 17500: 17490: 17473: 17469: 17465: 17462: 17460: 17456: 17452: 17448: 17447: 17442: 17438: 17434: 17431: 17429: 17425: 17421: 17417: 17416: 17406: 17395: 17392: 17387: 17383: 17379: 17374: 17370: 17359: 17346: 17342: 17329: 17328: 17317: 17314: 17311: 17308: 17305: 17302: 17299: 17296: 17293: 17290: 17285: 17281: 17270: 17257: 17253: 17249: 17246: 17243: 17240: 17227: 17216: 17213: 17210: 17207: 17204: 17201: 17198: 17195: 17192: 17189: 17184: 17180: 17169: 17158: 17153: 17149: 17145: 17142: 17139: 17136: 17131: 17127: 17123: 17120: 17117: 17107: 17094: 17090: 17086: 17083: 17080: 17077: 17064: 17061:Characteristic 17058: 17057: 17044: 17038: 17035: 17032: 17029: 17027: 17024: 17021: 17018: 17017: 17014: 17011: 17008: 17005: 17003: 17000: 16997: 16994: 16993: 16991: 16979: 16966: 16960: 16957: 16955: 16952: 16951: 16948: 16945: 16943: 16940: 16939: 16937: 16925: 16912: 16906: 16903: 16900: 16897: 16895: 16892: 16889: 16886: 16885: 16882: 16879: 16876: 16873: 16870: 16868: 16865: 16862: 16859: 16858: 16856: 16844: 16831: 16823: 16819: 16815: 16813: 16810: 16809: 16806: 16803: 16799: 16795: 16791: 16790: 16788: 16776: 16763: 16757: 16754: 16752: 16749: 16748: 16745: 16742: 16740: 16737: 16736: 16734: 16722: 16718: 16717: 16710: 16701: 16694: 16687: 16680: 16676: 16675: 16670: 16665: 16660: 16657: 16652: 16639: 16636: 16634: 16631: 16599: 16598:Modern methods 16596: 16582: 16555: 16550: 16537: 16536: 16521: 16515: 16510: 16502: 16498: 16493: 16488: 16480: 16477: 16454: 16433: 16407: 16403: 16400: 16375: 16372: 16368: 16364: 16361: 16358: 16355: 16352: 16331:Main article: 16328: 16325: 16312: 16282: 16276: 16273: 16270: 16267: 16265: 16262: 16261: 16259: 16236: 16233: 16230: 16227: 16224: 16221: 16201: 16198: 16195: 16175: 16152: 16149: 16146: 16126: 16106: 16076: 16070: 16067: 16064: 16062: 16059: 16058: 16056: 16033: 16030: 16027: 16024: 16001: 15995: 15992: 15989: 15987: 15985: 15982: 15979: 15976: 15973: 15970: 15969: 15966: 15963: 15960: 15958: 15956: 15953: 15950: 15947: 15944: 15941: 15940: 15937: 15909: 15903: 15900: 15897: 15894: 15892: 15890: 15887: 15884: 15881: 15878: 15875: 15874: 15871: 15868: 15865: 15862: 15860: 15858: 15855: 15852: 15849: 15846: 15845: 15842: 15814: 15808: 15805: 15804: 15801: 15798: 15797: 15795: 15790: 15787: 15784: 15779: 15773: 15770: 15769: 15766: 15763: 15762: 15760: 15753: 15747: 15744: 15742: 15739: 15738: 15735: 15732: 15730: 15727: 15726: 15724: 15702: 15699: 15696: 15693: 15690: 15666: 15660: 15657: 15655: 15652: 15651: 15648: 15645: 15643: 15640: 15639: 15637: 15632: 15629: 15613: 15610: 15589: 15565: 15541: 15514: 15511: 15491: 15488: 15485: 15445: 15442: 15439: 15419: 15407: 15404: 15400:floating-point 15395: 15392: 15384:Main article: 15381: 15378: 15377: 15376: 15365: 15362: 15359: 15354: 15350: 15346: 15340: 15337: 15332: 15329: 15321: 15317: 15313: 15310: 15307: 15299: 15296: 15293: 15289: 15285: 15280: 15275: 15272: 15269: 15265: 15256: 15253: 15250: 15246: 15242: 15234: 15230: 15226: 15221: 15216: 15212: 15190: 15189: 15178: 15173: 15168: 15164: 15158: 15154: 15150: 15147: 15144: 15139: 15134: 15130: 15124: 15120: 15116: 15111: 15107: 15083: 15078: 15074: 15069: 15066: 15062: 15057: 15053: 15026: 15018: 15015: 15012: 15009: 15006: 15002: 14998: 14996: 14993: 14989: 14985: 14981: 14980: 14978: 14952: 14947: 14944: 14941: 14938: 14935: 14931: 14927: 14922: 14919: 14916: 14913: 14910: 14906: 14899: 14896: 14890: 14885: 14882: 14879: 14875: 14871: 14866: 14863: 14860: 14856: 14840: 14839: 14828: 14825: 14822: 14817: 14813: 14809: 14806: 14801: 14798: 14795: 14791: 14787: 14784: 14781: 14776: 14773: 14770: 14766: 14760: 14756: 14752: 14747: 14744: 14741: 14737: 14731: 14727: 14723: 14718: 14714: 14691: 14690: 14679: 14674: 14671: 14668: 14664: 14658: 14654: 14650: 14647: 14644: 14639: 14636: 14633: 14629: 14623: 14619: 14615: 14610: 14607: 14604: 14600: 14594: 14590: 14586: 14581: 14577: 14564:have the form 14557: 14554: 14536:weight vectors 14505:Main article: 14502: 14499: 14421:Main article: 14418: 14415: 14338:always form a 14322: 14301: 14215: 14212: 14208: 14204: 14201: 14198: 14195: 14192: 14190: 14188: 14184: 14180: 14177: 14174: 14171: 14170: 14167: 14164: 14160: 14156: 14152: 14148: 14145: 14142: 14139: 14137: 14135: 14131: 14127: 14123: 14119: 14116: 14113: 14112: 14038: 14035: 14031: 14027: 14024: 14021: 14018: 14015: 14013: 14011: 14007: 14003: 14000: 13997: 13994: 13993: 13990: 13987: 13983: 13979: 13976: 13973: 13970: 13966: 13962: 13959: 13956: 13953: 13951: 13949: 13945: 13941: 13937: 13933: 13930: 13927: 13926: 13898:is called the 13877: 13873: 13868: 13864: 13861: 13858: 13854: 13850: 13847: 13844: 13840: 13835: 13831: 13828: 13812: 13809: 13788:to the vector 13752: 13751: 13742: 13740: 13729: 13725: 13721: 13718: 13715: 13711: 13707: 13704: 13653: 13650: 13647: 13644: 13641: 13638: 13595: 13592: 13560: 13555: 13552: 13548: 13544: 13541: 13538: 13535: 13532: 13529: 13526: 13523: 13520: 13479: 13476: 13473: 13470: 13467: 13464: 13461: 13458: 13455: 13452: 13449: 13443: 13440: 13436: 13410: 13407: 13403: 13388: 13385: 13381:eigenfunctions 13362: 13359: 13356: 13353: 13350: 13347: 13344: 13341: 13338: 13335: 13332: 13310:differentiable 13308:of infinitely 13274:Main article: 13271: 13268: 13241: 13237: 13216: 13209: 13204: 13200: 13196: 13191: 13187: 13183: 13177: 13174: 13171: 13167: 13160: 13157: 13152: 13148: 13144: 13139: 13135: 13131: 13126: 13122: 13118: 13112: 13108: 13101: 13096: 13091: 13084: 13081: 13078: 13074: 13069: 13044: 13041: 13034: 13009: 13003: 13000: 12998: 12995: 12993: 12990: 12988: 12985: 12984: 12982: 12949: 12943: 12940: 12938: 12935: 12932: 12930: 12927: 12925: 12922: 12921: 12919: 12887: 12866: 12861: 12857: 12853: 12850: 12847: 12844: 12839: 12835: 12831: 12828: 12825: 12822: 12819: 12814: 12808: 12805: 12802: 12799: 12797: 12794: 12792: 12789: 12787: 12784: 12783: 12780: 12777: 12775: 12772: 12769: 12766: 12764: 12761: 12759: 12756: 12755: 12752: 12749: 12747: 12744: 12742: 12739: 12736: 12733: 12731: 12728: 12727: 12724: 12721: 12719: 12716: 12714: 12711: 12709: 12706: 12703: 12700: 12699: 12697: 12692: 12689: 12686: 12683: 12680: 12677: 12674: 12671: 12651: 12646: 12640: 12637: 12635: 12632: 12630: 12627: 12625: 12622: 12621: 12618: 12615: 12613: 12610: 12608: 12605: 12603: 12600: 12599: 12596: 12593: 12591: 12588: 12586: 12583: 12581: 12578: 12577: 12574: 12571: 12569: 12566: 12564: 12561: 12559: 12556: 12555: 12553: 12548: 12545: 12533: 12530: 12515: 12510: 12504: 12501: 12500: 12497: 12494: 12493: 12490: 12487: 12486: 12484: 12479: 12472: 12468: 12462: 12456: 12451: 12445: 12442: 12439: 12438: 12435: 12432: 12431: 12428: 12425: 12424: 12422: 12417: 12410: 12406: 12400: 12394: 12389: 12381: 12378: 12373: 12372: 12369: 12366: 12363: 12362: 12359: 12356: 12355: 12353: 12348: 12341: 12337: 12331: 12308: 12298: 12288: 12270: 12267: 12264: 12261: 12258: 12255: 12252: 12249: 12246: 12243: 12240: 12237: 12234: 12231: 12228: 12225: 12222: 12219: 12216: 12213: 12210: 12207: 12204: 12201: 12175: 12170: 12164: 12161: 12159: 12156: 12154: 12151: 12150: 12147: 12144: 12142: 12139: 12137: 12134: 12133: 12130: 12127: 12125: 12122: 12120: 12117: 12116: 12114: 12109: 12106: 12080: 12077: 12062: 12057: 12051: 12048: 12047: 12044: 12041: 12040: 12037: 12034: 12033: 12031: 12026: 12019: 12015: 12009: 12003: 11998: 11992: 11989: 11988: 11985: 11982: 11981: 11978: 11975: 11974: 11972: 11967: 11960: 11956: 11950: 11944: 11939: 11933: 11930: 11929: 11926: 11923: 11922: 11919: 11916: 11915: 11913: 11908: 11901: 11897: 11891: 11868: 11858: 11848: 11830: 11827: 11824: 11821: 11818: 11815: 11812: 11809: 11806: 11803: 11800: 11797: 11794: 11791: 11788: 11785: 11782: 11779: 11776: 11773: 11770: 11767: 11764: 11761: 11735: 11730: 11724: 11721: 11719: 11716: 11714: 11711: 11710: 11707: 11704: 11702: 11699: 11697: 11694: 11693: 11690: 11687: 11685: 11682: 11680: 11677: 11676: 11674: 11669: 11666: 11648: 11645: 11633: 11628: 11621: 11617: 11611: 11606: 11599: 11595: 11589: 11575: 11568: 11543: 11535: 11531: 11527: 11523: 11519: 11515: 11513: 11510: 11509: 11507: 11501: 11494: 11490: 11484: 11452: 11444: 11440: 11436: 11432: 11428: 11424: 11422: 11419: 11418: 11416: 11410: 11403: 11399: 11393: 11365: 11360: 11352: 11348: 11344: 11343: 11338: 11334: 11330: 11329: 11326: 11323: 11322: 11320: 11315: 11310: 11306: 11302: 11297: 11291: 11288: 11287: 11282: 11278: 11274: 11273: 11268: 11264: 11260: 11259: 11257: 11252: 11247: 11239: 11235: 11231: 11230: 11225: 11221: 11217: 11216: 11213: 11210: 11209: 11207: 11202: 11182: 11177: 11169: 11165: 11161: 11160: 11155: 11151: 11147: 11146: 11143: 11140: 11139: 11137: 11132: 11127: 11123: 11119: 11114: 11108: 11105: 11104: 11099: 11095: 11091: 11090: 11085: 11081: 11077: 11076: 11074: 11069: 11064: 11056: 11052: 11048: 11047: 11042: 11038: 11034: 11033: 11030: 11027: 11026: 11024: 11019: 10997: 10992: 10988: 10984: 10979: 10974: 10970: 10965: 10960: 10956: 10952: 10947: 10942: 10938: 10933: 10930: 10927: 10922: 10918: 10912: 10908: 10885: 10880: 10874: 10871: 10870: 10867: 10864: 10863: 10860: 10857: 10856: 10854: 10849: 10846: 10843: 10838: 10832: 10829: 10828: 10825: 10822: 10821: 10818: 10815: 10814: 10812: 10807: 10802: 10796: 10793: 10792: 10789: 10786: 10785: 10782: 10779: 10778: 10776: 10771: 10759: 10740: 10737: 10734: 10729: 10725: 10712:imaginary unit 10699: 10673: 10669: 10663: 10660: 10655: 10652: 10647: 10644: 10639: 10634: 10630: 10626: 10623: 10621: 10617: 10613: 10609: 10608: 10603: 10599: 10593: 10590: 10585: 10582: 10577: 10574: 10571: 10569: 10565: 10561: 10557: 10556: 10553: 10550: 10547: 10545: 10541: 10537: 10533: 10532: 10506: 10501: 10495: 10492: 10490: 10487: 10485: 10482: 10481: 10478: 10475: 10473: 10470: 10468: 10465: 10464: 10461: 10458: 10456: 10453: 10451: 10448: 10447: 10445: 10440: 10437: 10422: 10419: 10394: 10388: 10385: 10383: 10380: 10378: 10375: 10374: 10372: 10336: 10330: 10327: 10325: 10322: 10319: 10317: 10314: 10313: 10311: 10276: 10270: 10267: 10265: 10262: 10260: 10257: 10256: 10254: 10220: 10217: 10214: 10211: 10208: 10203: 10199: 10195: 10192: 10187: 10183: 10179: 10176: 10171: 10166: 10163: 10160: 10157: 10154: 10151: 10148: 10145: 10142: 10139: 10136: 10133: 10128: 10123: 10120: 10117: 10114: 10111: 10108: 10105: 10103: 10101: 10098: 10093: 10087: 10084: 10081: 10078: 10076: 10073: 10071: 10068: 10067: 10064: 10061: 10059: 10056: 10053: 10050: 10048: 10045: 10044: 10041: 10038: 10036: 10033: 10031: 10028: 10025: 10022: 10021: 10019: 10014: 10010: 10004: 9998: 9995: 9993: 9990: 9988: 9985: 9984: 9981: 9978: 9976: 9973: 9971: 9968: 9967: 9964: 9961: 9959: 9956: 9954: 9951: 9950: 9948: 9943: 9940: 9935: 9929: 9926: 9924: 9921: 9919: 9916: 9915: 9912: 9909: 9907: 9904: 9902: 9899: 9898: 9895: 9892: 9890: 9887: 9885: 9882: 9881: 9879: 9873: 9869: 9866: 9864: 9862: 9859: 9856: 9853: 9850: 9847: 9844: 9841: 9840: 9814: 9809: 9803: 9800: 9798: 9795: 9793: 9790: 9789: 9786: 9783: 9781: 9778: 9776: 9773: 9772: 9769: 9766: 9764: 9761: 9759: 9756: 9755: 9753: 9748: 9745: 9733: 9730: 9704: 9694: 9664: 9658: 9655: 9654: 9651: 9648: 9647: 9645: 9640: 9635: 9627: 9623: 9619: 9618: 9613: 9609: 9605: 9604: 9602: 9597: 9592: 9589: 9586: 9581: 9567: 9560: 9539: 9536: 9533: 9531: 9527: 9523: 9519: 9516: 9511: 9507: 9503: 9500: 9499: 9496: 9493: 9490: 9487: 9485: 9481: 9477: 9473: 9470: 9465: 9461: 9457: 9454: 9451: 9450: 9445: 9439: 9436: 9435: 9432: 9429: 9428: 9426: 9421: 9416: 9408: 9404: 9400: 9399: 9394: 9390: 9386: 9385: 9383: 9376: 9370: 9367: 9364: 9362: 9359: 9358: 9355: 9352: 9350: 9347: 9344: 9343: 9341: 9336: 9333: 9331: 9327: 9324: 9321: 9316: 9311: 9308: 9305: 9302: 9299: 9296: 9293: 9292: 9246: 9240: 9237: 9234: 9233: 9230: 9227: 9226: 9224: 9219: 9214: 9206: 9202: 9198: 9195: 9194: 9189: 9185: 9181: 9180: 9178: 9173: 9168: 9165: 9162: 9157: 9143: 9136: 9119: 9116: 9111: 9107: 9103: 9100: 9095: 9091: 9087: 9066: 9060: 9057: 9056: 9053: 9050: 9049: 9047: 9042: 9037: 9029: 9025: 9021: 9020: 9015: 9011: 9007: 9006: 9004: 8997: 8991: 8988: 8986: 8983: 8982: 8979: 8976: 8974: 8971: 8970: 8968: 8963: 8958: 8955: 8952: 8947: 8942: 8939: 8936: 8933: 8930: 8870: 8867: 8864: 8861: 8858: 8855: 8852: 8849: 8846: 8843: 8840: 8837: 8834: 8832: 8830: 8825: 8821: 8817: 8814: 8811: 8808: 8805: 8802: 8799: 8797: 8795: 8790: 8784: 8781: 8778: 8775: 8773: 8770: 8769: 8766: 8763: 8761: 8758: 8755: 8752: 8751: 8749: 8744: 8740: 8734: 8728: 8725: 8723: 8720: 8719: 8716: 8713: 8711: 8708: 8707: 8705: 8700: 8697: 8692: 8686: 8683: 8681: 8678: 8677: 8674: 8671: 8669: 8666: 8665: 8663: 8657: 8653: 8650: 8648: 8646: 8643: 8640: 8637: 8634: 8631: 8628: 8625: 8624: 8573: 8568: 8562: 8559: 8557: 8554: 8553: 8550: 8547: 8545: 8542: 8541: 8539: 8534: 8531: 8508: 8498: 8482: 8474: 8471: 8469: 8466: 8465: 8462: 8459: 8457: 8454: 8453: 8449: 8428: 8425: 8423: 8420: 8406: 8384: 8371: 8365: 8360: 8356: 8344: 8332:quadratic form 8319: 8300:Main article: 8297: 8294: 8182:diagonalizable 8175:is said to be 8158: 8157: 8146: 8143: 8140: 8137: 8134: 8129: 8126: 8122: 8103: 8102: 8091: 8086: 8083: 8079: 8075: 8072: 8069: 8066: 8044: 8043: 8032: 8029: 8026: 8023: 8020: 8017: 7992: 7989: 7988: 7977: 7972: 7964: 7959: 7952: 7948: 7944: 7942: 7939: 7935: 7930: 7923: 7919: 7915: 7911: 7906: 7899: 7895: 7891: 7890: 7888: 7883: 7880: 7877: 7843: 7842: 7831: 7826: 7818: 7813: 7808: 7806: 7803: 7799: 7794: 7789: 7785: 7780: 7775: 7774: 7772: 7767: 7764: 7732: 7725: 7718: 7709: 7702: 7695: 7673:Main article: 7670: 7667: 7654: 7634: 7606: 7577: 7556: 7528: 7516: 7511: 7508: 7496: 7483: 7462: 7442: 7418: 7398: 7395: 7392: 7372: 7352: 7330: 7326: 7322: 7319: 7316: 7312: 7291: 7261: 7257: 7253: 7250: 7246: 7242: 7216: 7196: 7193: 7190: 7159: 7156: 7155: 7154: 7142: 7139: 7134: 7130: 7126: 7123: 7120: 7117: 7114: 7111: 7106: 7102: 7098: 7095: 7092: 7072: 7069: 7066: 7063: 7043: 7023: 7020: 7017: 7012: 7008: 7004: 7001: 6998: 6995: 6992: 6987: 6983: 6979: 6959: 6956: 6953: 6950: 6929: 6925: 6922: 6902: 6899: 6896: 6891: 6887: 6883: 6880: 6877: 6874: 6871: 6866: 6862: 6858: 6838: 6818: 6815: 6812: 6792: 6787: 6783: 6779: 6776: 6773: 6768: 6764: 6760: 6740: 6737: 6734: 6714: 6703: 6691: 6688: 6684: 6678: 6674: 6669: 6644: 6633: 6617: 6606: 6586: 6564: 6560: 6536: 6525: 6505: 6501: 6497: 6492: 6489: 6486: 6479: 6475: 6471: 6447: 6444: 6440: 6419: 6408: 6392: 6381: 6367: 6362: 6358: 6354: 6351: 6348: 6343: 6338: 6334: 6313: 6291: 6287: 6266: 6246: 6235: 6234: 6233: 6222: 6217: 6213: 6209: 6204: 6200: 6194: 6190: 6186: 6181: 6177: 6171: 6166: 6163: 6160: 6156: 6152: 6149: 6146: 6143: 6140: 6118: 6103: 6102: 6101: 6090: 6085: 6081: 6077: 6074: 6071: 6066: 6062: 6058: 6053: 6049: 6045: 6040: 6036: 6030: 6025: 6022: 6019: 6015: 6011: 6006: 6003: 5999: 5993: 5988: 5985: 5982: 5978: 5974: 5971: 5968: 5965: 5962: 5959: 5937: 5909: 5904: 5900: 5896: 5891: 5887: 5866: 5861: 5857: 5853: 5848: 5844: 5821: 5817: 5813: 5810: 5807: 5802: 5798: 5777: 5774: 5771: 5751: 5739: 5736: 5735: 5734: 5722: 5700: 5695: 5684:Any vector in 5682: 5667: 5647: 5625: 5620: 5607: 5593: 5588: 5566: 5542: 5539: 5534: 5530: 5509: 5489: 5461: 5458: 5455: 5450: 5446: 5442: 5439: 5437: 5435: 5432: 5431: 5428: 5425: 5420: 5416: 5412: 5407: 5403: 5397: 5392: 5389: 5386: 5382: 5378: 5375: 5373: 5369: 5365: 5361: 5360: 5340: 5320: 5315: 5311: 5307: 5302: 5298: 5275: 5271: 5248: 5244: 5240: 5237: 5234: 5229: 5225: 5204: 5201: 5198: 5178: 5155: 5152: 5149: 5144: 5140: 5136: 5133: 5130: 5127: 5122: 5118: 5097: 5075: 5072: 5069: 5064: 5060: 5055: 5051: 5048: 5045: 5042: 5022: 5019: 5016: 5013: 5010: 5007: 5004: 4984: 4964: 4961: 4958: 4955: 4952: 4949: 4946: 4943: 4940: 4937: 4934: 4931: 4928: 4925: 4922: 4902: 4899: 4896: 4893: 4884:is similar to 4873: 4870: 4867: 4864: 4844: 4835:commutes with 4824: 4804: 4801: 4798: 4795: 4792: 4789: 4786: 4783: 4780: 4777: 4774: 4771: 4768: 4765: 4762: 4742: 4739: 4736: 4714: 4711: 4708: 4703: 4699: 4694: 4690: 4670: 4667: 4662: 4658: 4654: 4651: 4631: 4611: 4591: 4588: 4585: 4580: 4576: 4572: 4569: 4549: 4546: 4543: 4538: 4534: 4513: 4491: 4486: 4481: 4478: 4473: 4468: 4463: 4441: 4438: 4435: 4430: 4426: 4420: 4414: 4411: 4407: 4402: 4397: 4372: 4369: 4366: 4361: 4357: 4336: 4333: 4330: 4325: 4321: 4317: 4314: 4311: 4308: 4303: 4299: 4276: 4273: 4270: 4267: 4264: 4259: 4255: 4251: 4248: 4245: 4242: 4237: 4233: 4229: 4226: 4199: 4196: 4193: 4190: 4187: 4184: 4181: 4178: 4175: 4172: 4169: 4166: 4163: 4160: 4157: 4152: 4148: 4083: 4080: 4077: 4072: 4068: 3860: 3855: 3812:is called the 3780:. So, the set 3747: 3743: 3738: 3734: 3730: 3725: 3721: 3718: 3715: 3712: 3708: 3704: 3700: 3695: 3691: 3688: 3643: 3640: 3629: 3620: 3611: 3602: 3593: 3584: 3571: 3562: 3553: 3532: 3529: 3526: 3522: 3517: 3513: 3509: 3503: 3499: 3493: 3488: 3485: 3482: 3478: 3474: 3471: 3469: 3465: 3461: 3457: 3456: 3453: 3450: 3447: 3444: 3439: 3435: 3431: 3426: 3422: 3418: 3415: 3413: 3411: 3408: 3407: 3363: 3358: 3353: 3349: 3345: 3340: 3336: 3331: 3327: 3324: 3319: 3315: 3311: 3308: 3303: 3298: 3294: 3290: 3285: 3281: 3276: 3272: 3269: 3264: 3260: 3256: 3251: 3246: 3242: 3238: 3233: 3229: 3224: 3220: 3217: 3212: 3208: 3204: 3201: 3198: 3195: 3192: 3189: 3186: 3183: 3180: 3141:has dimension 3132:divides evenly 3125: 3104: 3095: 3071: 3064: 3061: 3043: 3040: 2984: 2979: 2973: 2970: 2969: 2966: 2963: 2962: 2960: 2955: 2950: 2947: 2944: 2939: 2933: 2928: 2922: 2919: 2916: 2915: 2912: 2909: 2908: 2906: 2901: 2896: 2893: 2890: 2885: 2860: 2856: 2852: 2847: 2843: 2840: 2837: 2834: 2830: 2790: 2785: 2781: 2777: 2774: 2771: 2768: 2765: 2762: 2757: 2751: 2748: 2745: 2742: 2740: 2737: 2736: 2733: 2730: 2728: 2725: 2722: 2719: 2718: 2716: 2711: 2708: 2705: 2702: 2699: 2696: 2693: 2690: 2652: 2647: 2641: 2638: 2636: 2633: 2632: 2629: 2626: 2624: 2621: 2620: 2618: 2613: 2610: 2589: 2582: 2575: 2566: 2558: 2557: 2548: 2546: 2535: 2532: 2529: 2526: 2521: 2517: 2513: 2510: 2507: 2504: 2501: 2496: 2492: 2488: 2485: 2482: 2479: 2474: 2470: 2466: 2463: 2460: 2457: 2454: 2451: 2448: 2445: 2442: 2428:linear terms, 2365:is always (−1) 2319: 2318: 2309: 2307: 2296: 2293: 2290: 2287: 2284: 2281: 2278: 2275: 2272: 2254:are values of 2238:of the matrix 2232:if and only if 2215:Main article: 2212: 2209: 2184: 2183: 2174: 2172: 2161: 2157: 2153: 2149: 2144: 2140: 2137: 2134: 2131: 2127: 2063: 2062: 2053: 2051: 2040: 2036: 2032: 2029: 2025: 2021: 2017: 2013: 1978: 1973: 1969: 1963: 1960: 1956: 1950: 1945: 1942: 1939: 1935: 1931: 1926: 1922: 1916: 1913: 1909: 1905: 1902: 1899: 1894: 1890: 1884: 1881: 1877: 1873: 1868: 1864: 1858: 1855: 1851: 1847: 1842: 1838: 1815: 1807: 1803: 1799: 1798: 1795: 1792: 1791: 1786: 1782: 1778: 1777: 1772: 1768: 1764: 1763: 1761: 1756: 1751: 1743: 1739: 1735: 1734: 1731: 1728: 1727: 1722: 1718: 1714: 1713: 1708: 1704: 1700: 1699: 1697: 1690: 1682: 1679: 1675: 1671: 1669: 1666: 1662: 1659: 1655: 1651: 1647: 1644: 1640: 1636: 1635: 1632: 1629: 1627: 1624: 1622: 1619: 1617: 1614: 1613: 1608: 1605: 1601: 1597: 1595: 1592: 1588: 1584: 1580: 1576: 1572: 1568: 1567: 1562: 1559: 1555: 1551: 1549: 1546: 1542: 1538: 1534: 1530: 1526: 1522: 1521: 1519: 1497: 1493: 1489: 1485: 1481: 1440: 1437: 1432: 1429: 1426: 1417:In this case, 1404: 1400: 1396: 1393: 1389: 1350: 1345: 1339: 1336: 1333: 1332: 1329: 1326: 1325: 1322: 1319: 1316: 1315: 1313: 1308: 1304: 1289: 1283: 1280: 1279: 1276: 1273: 1270: 1269: 1266: 1263: 1262: 1260: 1255: 1251: 1206:applications. 1192: 1189: 1171:published the 1094:Alfred Clebsch 1041:Joseph Fourier 1005:principal axes 997:Leonhard Euler 978:linear algebra 973: 970: 969: 968: 949: 930: 887: 883: 879: 876: 872: 868: 824: 819: 816: 812: 808: 805: 800: 797: 793: 786: 783: 779: 766:eigenfunctions 749: 746: 742: 669:. In general, 650: 646: 642: 639: 636: 632: 628: 625: 567:principal axes 532: 529: 479: 475: 472: 468: 464: 435: 401: 379: 375: 354: 329: 326: 305: 280: 276: 272: 260: 257: 202: 169: 165: 162: 158: 154: 134: 110: 89: 30:linear algebra 15: 9: 6: 4: 3: 2: 25472: 25461: 25458: 25456: 25455:Matrix theory 25453: 25451: 25448: 25446: 25443: 25441: 25438: 25437: 25435: 25420: 25419: 25410: 25408: 25407: 25398: 25396: 25395: 25386: 25384: 25383: 25378: 25372: 25371: 25368: 25362: 25359: 25357: 25354: 25352: 25349: 25347: 25344: 25342: 25339: 25335: 25332: 25331: 25330: 25327: 25326: 25324: 25322: 25318: 25312: 25309: 25307: 25304: 25302: 25299: 25297: 25294: 25292: 25289: 25287: 25284: 25283: 25281: 25279: 25278:Computational 25275: 25267: 25264: 25262: 25259: 25257: 25254: 25253: 25252: 25249: 25247: 25244: 25242: 25239: 25237: 25234: 25232: 25229: 25227: 25224: 25222: 25219: 25217: 25214: 25212: 25209: 25207: 25204: 25202: 25199: 25197: 25194: 25193: 25191: 25189: 25185: 25179: 25176: 25174: 25171: 25169: 25166: 25164: 25161: 25159: 25156: 25155: 25153: 25151: 25147: 25141: 25138: 25136: 25133: 25131: 25128: 25126: 25123: 25122: 25120: 25118: 25117:Number theory 25114: 25108: 25105: 25103: 25100: 25098: 25095: 25093: 25090: 25088: 25085: 25083: 25080: 25078: 25075: 25074: 25072: 25070: 25066: 25060: 25057: 25055: 25052: 25050: 25049:Combinatorics 25047: 25046: 25044: 25042: 25038: 25032: 25029: 25027: 25024: 25022: 25019: 25017: 25014: 25012: 25009: 25007: 25004: 25002: 25001:Real analysis 24999: 24997: 24994: 24993: 24991: 24989: 24985: 24979: 24976: 24974: 24971: 24969: 24966: 24964: 24961: 24959: 24956: 24954: 24951: 24949: 24946: 24944: 24941: 24940: 24938: 24936: 24932: 24926: 24923: 24921: 24918: 24916: 24913: 24911: 24908: 24906: 24903: 24901: 24898: 24897: 24895: 24893: 24889: 24883: 24880: 24878: 24875: 24871: 24868: 24866: 24863: 24862: 24861: 24858: 24857: 24854: 24849: 24841: 24836: 24834: 24829: 24827: 24822: 24821: 24818: 24806: 24798: 24797: 24794: 24788: 24785: 24783: 24782:Sparse matrix 24780: 24778: 24775: 24773: 24770: 24768: 24765: 24764: 24762: 24760: 24756: 24750: 24747: 24745: 24742: 24740: 24737: 24735: 24732: 24730: 24727: 24725: 24722: 24721: 24719: 24717:constructions 24716: 24712: 24706: 24705:Outermorphism 24703: 24701: 24698: 24696: 24693: 24691: 24688: 24686: 24683: 24681: 24678: 24676: 24673: 24671: 24668: 24666: 24665:Cross product 24663: 24661: 24658: 24657: 24655: 24653: 24649: 24643: 24640: 24638: 24635: 24633: 24632:Outer product 24630: 24628: 24625: 24623: 24620: 24618: 24615: 24613: 24612:Orthogonality 24610: 24609: 24607: 24605: 24601: 24595: 24592: 24590: 24589:Cramer's rule 24587: 24585: 24582: 24580: 24577: 24575: 24572: 24570: 24567: 24565: 24562: 24560: 24559:Decomposition 24557: 24555: 24552: 24551: 24549: 24547: 24543: 24538: 24528: 24525: 24523: 24520: 24518: 24515: 24513: 24510: 24508: 24505: 24503: 24500: 24498: 24495: 24493: 24490: 24488: 24485: 24483: 24480: 24478: 24475: 24473: 24470: 24468: 24465: 24463: 24460: 24458: 24455: 24453: 24450: 24448: 24445: 24443: 24440: 24438: 24435: 24434: 24432: 24428: 24422: 24419: 24417: 24414: 24413: 24410: 24406: 24399: 24394: 24392: 24387: 24385: 24380: 24379: 24376: 24370: 24366: 24362: 24359: 24357: 24354: 24353: 24347: 24346: 24345: 24339: 24319: 24316: 24313: 24305: 24302: 24300: 24296: 24293: 24290: 24287: 24284: 24281: 24278: 24275: 24274: 24267: 24264: 24256: 24253:December 2019 24246: 24242: 24241:inappropriate 24238: 24234: 24228: 24226: 24219: 24210: 24209: 24197: 24195:0-03-010567-6 24191: 24187: 24182: 24179: 24177:0-9614088-5-5 24173: 24169: 24164: 24157: 24156: 24150: 24146: 24142: 24138: 24137:Sixty Symbols 24134: 24129: 24126: 24122: 24117: 24112: 24108: 24104: 24100: 24096: 24089: 24084: 24083: 24070: 24065: 24061: 24057: 24053: 24048: 24041: 24040: 24034: 24023: 24019: 24014: 24003: 23999: 23994: 23983: 23979: 23978:"Eigenvector" 23974: 23970: 23966: 23962: 23958: 23954: 23950: 23946: 23942: 23938: 23934: 23930: 23926: 23922: 23917: 23912: 23907: 23902: 23898: 23893: 23890: 23886: 23882: 23878: 23874: 23870: 23866: 23862: 23857: 23854: 23852:0-486-63518-X 23848: 23844: 23839: 23835: 23831: 23827: 23823: 23819: 23815: 23810: 23805: 23802:(1): 015005. 23801: 23797: 23793: 23788: 23785: 23779: 23775: 23770: 23767: 23761: 23757: 23753: 23748: 23745: 23741: 23737: 23733: 23728: 23725: 23719: 23715: 23710: 23706: 23700: 23696: 23695: 23689: 23686: 23682: 23678: 23674: 23669: 23666: 23664:0-486-41147-8 23660: 23656: 23652: 23648: 23644: 23639: 23636: 23632: 23628: 23624: 23620: 23616: 23611: 23608: 23606:0-19-501496-0 23602: 23598: 23593: 23590: 23584: 23580: 23575: 23571: 23570: 23564: 23560: 23559: 23553: 23549: 23544: 23540: 23536: 23531: 23528: 23524: 23520: 23516: 23512: 23508: 23504: 23500: 23499: 23493: 23490: 23484: 23480: 23476: 23472: 23468: 23465: 23463:0-13-537102-3 23459: 23455: 23450: 23446: 23441: 23437: 23433: 23428: 23424: 23419: 23415: 23411: 23410: 23404: 23401: 23399:0-201-01984-1 23395: 23391: 23387: 23382: 23379: 23375: 23371: 23367: 23362: 23357: 23353: 23349: 23345: 23341: 23337: 23332: 23325: 23321: 23317: 23313: 23309: 23304: 23299: 23295: 23291: 23284: 23279: 23276: 23274:0-534-93219-3 23270: 23265: 23264: 23257: 23254: 23250: 23246: 23242: 23237: 23233: 23228: 23224: 23220: 23216: 23212: 23208: 23204: 23200: 23196: 23192: 23188: 23183: 23178: 23174: 23170: 23166: 23161: 23157: 23156: 23150: 23147: 23145:0-395-14017-X 23141: 23137: 23132: 23131: 23124: 23121: 23119:0-471-84819-0 23115: 23111: 23107: 23102: 23099: 23095: 23090: 23089: 23077: 23072: 23065: 23060: 23053: 23048: 23041: 23036: 23028: 23024: 23017: 23010: 23005: 22998: 22993: 22986: 22981: 22974: 22969: 22962: 22957: 22955: 22947: 22942: 22935: 22930: 22928: 22926: 22924: 22916: 22911: 22904: 22899: 22893: 22889: 22885: 22880: 22873: 22868: 22861: 22856: 22849: 22844: 22837: 22832: 22825: 22820: 22813: 22808: 22806: 22798: 22793: 22786: 22781: 22774: 22773:Herstein 1964 22769: 22762: 22757: 22750: 22749:Herstein 1964 22745: 22738: 22733: 22731: 22723: 22718: 22711: 22706: 22704: 22702: 22694: 22693:Fraleigh 1976 22689: 22683:, p. 38. 22682: 22677: 22670: 22666: 22663: 22662: 22655: 22648: 22647: 22640: 22633: 22628: 22621: 22616: 22609: 22604: 22597: 22592: 22585: 22580: 22573: 22568: 22561: 22556: 22549: 22544: 22537: 22532: 22530: 22522: 22517: 22510: 22505: 22503: 22501: 22499: 22491: 22486: 22479: 22474: 22472: 22470: 22468: 22460: 22455: 22448: 22443: 22428: 22424: 22418: 22416: 22408: 22403: 22397:, p. 38. 22396: 22391: 22389: 22381: 22380:Herstein 1964 22376: 22374: 22362: 22361: 22353: 22346: 22341: 22337: 22325:into account. 22324: 22303: 22299: 22292: 22272: 22265:truncated to 22264: 22260: 22254: 22248: 22244: 22240: 22239:Hefferon 2001 22236: 22232: 22226: 22218: 22214: 22210: 22205: 22200: 22196: 22192: 22188: 22184: 22183: 22179: 22172: 22168: 22165: 22161: 22157: 22153: 22148: 22140: 22136: 22132: 22128: 22127:Arthur Cayley 22124: 22121: 22117: 22113: 22109: 22105: 22101: 22098: 22094: 22090: 22086: 22082: 22081: 22077: 22073: 22063: 22060: 22058: 22055: 22053: 22050: 22048: 22045: 22043: 22040: 22038: 22035: 22033: 22030: 22028: 22025: 22023: 22020: 22018: 22015: 22013: 22010: 22008: 22007:Eigenoperator 22005: 22003: 22000: 21999: 21993: 21990: 21985: 21983: 21980:to faces for 21979: 21975: 21971: 21967: 21963: 21959: 21958: 21953: 21949: 21945: 21941: 21935: 21927: 21923: 21914: 21898: 21894: 21871: 21867: 21844: 21840: 21817: 21813: 21790: 21786: 21775: 21765: 21749: 21745: 21741: 21736: 21732: 21728: 21723: 21719: 21696: 21692: 21688: 21683: 21679: 21675: 21670: 21666: 21643: 21639: 21635: 21630: 21626: 21622: 21617: 21613: 21590: 21586: 21563: 21559: 21536: 21532: 21523: 21519: 21501: 21472: 21443: 21414: 21410: 21406: 21401: 21397: 21393: 21388: 21384: 21361: 21351: 21346: 21336: 21331: 21315: 21313: 21309: 21305: 21294: 21291: 21283: 21280:December 2023 21273: 21269: 21263: 21260:This section 21258: 21249: 21248: 21240: 21238: 21234: 21230: 21227: 21223: 21219: 21215: 21211: 21207: 21203: 21202:Fock operator 21199: 21195: 21191: 21188:, within the 21187: 21183: 21179: 21169: 21155: 21152: 21143: 21122: 21119: 21110: 21081: 21054: 21027: 20990: 20986: 20983:are randomly 20982: 20978: 20974: 20965: 20946: 20916: 20891: 20878: 20870: 20867: 20851: 20831: 20811: 20803: 20782: 20744: 20731: 20728: 20720: 20707: 20700: 20699: 20698: 20679: 20661: 20656: 20642: 20620: 20616: 20607: 20603: 20599: 20598:Hilbert space 20595: 20577: 20573: 20564: 20559: 20557: 20541: 20533: 20515: 20511: 20502: 20498: 20482: 20456: 20452: 20448: 20445: 20440: 20436: 20432: 20425: 20424: 20423: 20421: 20417: 20401: 20389: 20385: 20381: 20377: 20373: 20357: 20353: 20350: 20346: 20343: 20339: 20336: 20333: 20330: 20322: 20318: 20314: 20313:hydrogen atom 20310: 20306: 20302: 20301:wavefunctions 20297: 20288: 20286: 20282: 20278: 20274: 20267:Stress tensor 20264: 20262: 20258: 20255:of moment of 20254: 20250: 20246: 20242: 20238: 20228: 20226: 20222: 20217: 20215: 20210: 20197: 20194: 20191: 20187: 20183: 20180: 20177: 20174: 20171: 20168: 20163: 20159: 20154: 20145: 20129: 20126: 20123: 20120: 20117: 20111: 20108: 20102: 20099: 20093: 20090: 20084: 20076: 20060: 20052: 20048: 20032: 20010: 20006: 19985: 19982: 19977: 19973: 19969: 19966: 19963: 19956: 19952: 19936: 19928: 19912: 19892: 19883: 19869: 19860: 19847: 19844: 19841: 19838: 19832: 19829: 19823: 19803: 19800: 19797: 19794: 19791: 19785: 19782: 19776: 19768: 19764: 19760: 19754: 19745: 19736: 19734: 19729: 19725: 19718:Markov chains 19715: 19713: 19708: 19704: 19700: 19696: 19692: 19688: 19683: 19669: 19649: 19629: 19602: 19598: 19591: 19588: 19582: 19578: 19558: 19536: 19532: 19528: 19525: 19521: 19498: 19494: 19471: 19468: 19464: 19443: 19435: 19417: 19413: 19409: 19406: 19402: 19398: 19393: 19389: 19385: 19382: 19378: 19374: 19371: 19363: 19347: 19344: 19341: 19333: 19329: 19313: 19306: 19302: 19298: 19288: 19286: 19282: 19278: 19274: 19270: 19266: 19262: 19261:Q methodology 19258: 19254: 19250: 19245: 19243: 19239: 19235: 19231: 19227: 19223: 19219: 19215: 19211: 19208: 19204: 19200: 19196: 19192: 19189: 19185: 19179: 19175: 19169: 19161: 19157: 19153: 19134: 19131: 19128: 19102: 19099: 19096: 19085: 19080: 19071: 19069: 19064: 19050: 19047: 19044: 19041: 19038: 19035: 19032: 19029: 19003: 18995: 18992: 18989: 18983: 18980: 18977: 18974: 18967: 18963: 18936: 18930: 18927: 18920: 18914: 18909: 18907: 18900: 18884: 18878: 18871: 18865: 18860: 18858: 18851: 18833: 18817: 18811: 18804: 18798: 18793: 18788: 18774: 18754: 18748: 18745: 18738: 18732: 18727: 18725: 18718: 18702: 18696: 18693: 18686: 18680: 18675: 18673: 18666: 18648: 18628: 18622: 18615: 18609: 18604: 18602: 18595: 18579: 18573: 18566: 18560: 18555: 18553: 18546: 18528: 18525: 18523:Eigenvectors 18521: 18502: 18499: 18497: 18490: 18486: 18478: 18475: 18473: 18466: 18462: 18450: 18436: 18433: 18428: 18424: 18416: 18398: 18395: 18393: 18386: 18382: 18374: 18371: 18369: 18362: 18358: 18346: 18328: 18325: 18323: 18316: 18312: 18304: 18301: 18299: 18292: 18288: 18276: 18262: 18259: 18254: 18250: 18242: 18223: 18219: 18212: 18209: 18204: 18200: 18185: 18166: 18163: 18161: 18154: 18150: 18142: 18139: 18137: 18130: 18126: 18114: 18100: 18097: 18092: 18088: 18080: 18062: 18059: 18057: 18050: 18046: 18038: 18035: 18033: 18026: 18022: 18010: 17992: 17989: 17987: 17980: 17976: 17968: 17965: 17963: 17956: 17952: 17940: 17926: 17923: 17918: 17914: 17906: 17887: 17883: 17876: 17873: 17868: 17864: 17849: 17830: 17827: 17824: 17821: 17818: 17815: 17812: 17809: 17807: 17797: 17794: 17790: 17786: 17784: 17777: 17773: 17765: 17762: 17759: 17756: 17753: 17750: 17747: 17744: 17742: 17732: 17728: 17724: 17722: 17715: 17711: 17699: 17685: 17682: 17677: 17673: 17669: 17664: 17660: 17652: 17634: 17631: 17628: 17625: 17622: 17619: 17616: 17613: 17610: 17608: 17598: 17595: 17592: 17588: 17584: 17582: 17575: 17571: 17563: 17560: 17557: 17554: 17551: 17548: 17545: 17542: 17539: 17537: 17527: 17524: 17520: 17516: 17514: 17507: 17503: 17491: 17471: 17467: 17463: 17461: 17454: 17450: 17440: 17436: 17432: 17430: 17423: 17419: 17407: 17393: 17390: 17385: 17381: 17377: 17372: 17368: 17360: 17344: 17340: 17332:Eigenvalues, 17330: 17315: 17312: 17309: 17303: 17297: 17294: 17291: 17288: 17283: 17279: 17271: 17255: 17247: 17244: 17241: 17228: 17214: 17211: 17208: 17202: 17196: 17193: 17190: 17187: 17182: 17178: 17170: 17151: 17147: 17143: 17140: 17129: 17125: 17121: 17118: 17108: 17092: 17084: 17081: 17078: 17065: 17059: 17042: 17036: 17033: 17030: 17025: 17022: 17019: 17012: 17009: 17006: 17001: 16998: 16995: 16989: 16980: 16964: 16958: 16953: 16946: 16941: 16935: 16926: 16910: 16904: 16901: 16898: 16893: 16890: 16887: 16880: 16877: 16874: 16871: 16866: 16863: 16860: 16854: 16845: 16829: 16821: 16817: 16811: 16804: 16797: 16793: 16786: 16777: 16761: 16755: 16750: 16743: 16738: 16732: 16723: 16719: 16715: 16711: 16706: 16702: 16699: 16695: 16692: 16688: 16685: 16681: 16679:Illustration 16677: 16674: 16669: 16664: 16656: 16651: 16650: 16644: 16630: 16626: 16624: 16620: 16616: 16613: 16609: 16605: 16595: 16571: 16553: 16513: 16496: 16491: 16478: 16475: 16468: 16467: 16466: 16452: 16421: 16401: 16398: 16373: 16370: 16362: 16359: 16356: 16353: 16341: 16334: 16324: 16310: 16280: 16274: 16271: 16268: 16263: 16257: 16234: 16231: 16228: 16225: 16222: 16219: 16199: 16196: 16193: 16173: 16164: 16150: 16147: 16144: 16124: 16104: 16074: 16068: 16065: 16060: 16054: 16031: 16028: 16025: 16022: 16013: 15993: 15990: 15988: 15983: 15980: 15977: 15974: 15971: 15964: 15961: 15959: 15954: 15951: 15948: 15945: 15942: 15935: 15901: 15898: 15895: 15893: 15888: 15885: 15882: 15879: 15876: 15869: 15866: 15863: 15861: 15856: 15853: 15850: 15847: 15840: 15832: 15827: 15812: 15806: 15799: 15793: 15788: 15785: 15782: 15777: 15771: 15764: 15758: 15751: 15745: 15740: 15733: 15728: 15722: 15700: 15697: 15694: 15691: 15688: 15679: 15664: 15658: 15653: 15646: 15641: 15635: 15630: 15627: 15619: 15609: 15607: 15606:exact formula 15603: 15587: 15579: 15563: 15555: 15539: 15531: 15526: 15512: 15509: 15489: 15486: 15483: 15475: 15471: 15467: 15463: 15457: 15443: 15440: 15437: 15417: 15403: 15401: 15391: 15387: 15363: 15360: 15357: 15352: 15348: 15344: 15338: 15335: 15330: 15327: 15319: 15315: 15311: 15308: 15305: 15297: 15294: 15291: 15287: 15283: 15278: 15273: 15270: 15267: 15263: 15254: 15251: 15248: 15244: 15240: 15232: 15228: 15224: 15219: 15214: 15210: 15199: 15198: 15197: 15195: 15176: 15171: 15166: 15162: 15156: 15152: 15148: 15145: 15142: 15137: 15132: 15128: 15122: 15118: 15114: 15109: 15105: 15097: 15096: 15095: 15081: 15076: 15072: 15067: 15064: 15060: 15055: 15051: 15042: 15024: 15016: 15013: 15010: 15007: 15004: 15000: 14994: 14987: 14983: 14976: 14966: 14950: 14945: 14942: 14939: 14936: 14933: 14929: 14925: 14920: 14917: 14914: 14911: 14908: 14904: 14897: 14894: 14888: 14883: 14880: 14877: 14873: 14869: 14864: 14861: 14858: 14854: 14845: 14826: 14823: 14820: 14815: 14811: 14807: 14804: 14799: 14796: 14793: 14789: 14785: 14782: 14779: 14774: 14771: 14768: 14764: 14758: 14754: 14750: 14745: 14742: 14739: 14735: 14729: 14725: 14721: 14716: 14712: 14704: 14703: 14702: 14700: 14696: 14677: 14672: 14669: 14666: 14662: 14656: 14652: 14648: 14645: 14642: 14637: 14634: 14631: 14627: 14621: 14617: 14613: 14608: 14605: 14602: 14598: 14592: 14588: 14584: 14579: 14575: 14567: 14566: 14565: 14563: 14560:The simplest 14553: 14551: 14547: 14543: 14541: 14540:weight spaces 14537: 14533: 14528: 14526: 14522: 14518: 14514: 14508: 14498: 14496: 14492: 14488: 14484: 14480: 14477: 14473: 14468: 14466: 14462: 14458: 14454: 14450: 14446: 14442: 14438: 14434: 14430: 14424: 14414: 14412: 14408: 14404: 14400: 14396: 14392: 14388: 14384: 14380: 14376: 14372: 14368: 14364: 14359: 14357: 14353: 14349: 14345: 14341: 14337: 14332: 14330: 14325: 14321: 14317: 14313: 14309: 14304: 14300: 14297: 14292: 14290: 14286: 14282: 14278: 14274: 14270: 14266: 14263: 14259: 14255: 14251: 14247: 14243: 14239: 14235: 14230: 14213: 14202: 14196: 14193: 14191: 14178: 14172: 14165: 14154: 14143: 14140: 14138: 14125: 14114: 14102: 14098: 14094: 14090: 14086: 14082: 14078: 14074: 14070: 14066: 14062: 14058: 14053: 14036: 14022: 14019: 14016: 14014: 14001: 13995: 13988: 13974: 13971: 13957: 13954: 13952: 13939: 13928: 13915: 13913: 13909: 13905: 13901: 13897: 13893: 13888: 13875: 13871: 13862: 13859: 13845: 13842: 13833: 13829: 13826: 13818: 13808: 13806: 13802: 13798: 13795: 13791: 13787: 13783: 13779: 13775: 13771: 13767: 13763: 13759: 13750: 13743: 13741: 13727: 13719: 13716: 13702: 13695: 13694: 13691: 13689: 13685: 13681: 13677: 13673: 13669: 13664: 13651: 13648: 13642: 13639: 13636: 13628: 13624: 13620: 13616: 13612: 13609: 13605: 13601: 13591: 13589: 13588:eigenfunction 13584: 13582: 13578: 13574: 13558: 13553: 13550: 13546: 13539: 13533: 13530: 13524: 13518: 13511: 13507: 13503: 13499: 13495: 13490: 13477: 13471: 13465: 13462: 13459: 13453: 13447: 13441: 13438: 13434: 13408: 13405: 13401: 13384: 13382: 13378: 13373: 13357: 13351: 13348: 13345: 13339: 13333: 13330: 13323: 13319: 13315: 13311: 13307: 13303: 13299: 13295: 13291: 13287: 13283: 13277: 13276:Eigenfunction 13267: 13265: 13261: 13257: 13239: 13235: 13214: 13202: 13198: 13194: 13189: 13185: 13175: 13172: 13169: 13165: 13150: 13146: 13137: 13133: 13129: 13124: 13120: 13110: 13106: 13099: 13094: 13082: 13079: 13076: 13072: 13058: 13054: 13050: 13040: 13037: 13033: 13007: 13001: 12996: 12991: 12986: 12980: 12947: 12941: 12936: 12933: 12928: 12923: 12917: 12906: 12901: 12899: 12895: 12890: 12886: 12882: 12877: 12864: 12859: 12851: 12848: 12845: 12837: 12829: 12826: 12823: 12817: 12812: 12806: 12803: 12800: 12795: 12790: 12785: 12778: 12773: 12770: 12767: 12762: 12757: 12750: 12745: 12740: 12737: 12734: 12729: 12722: 12717: 12712: 12707: 12704: 12701: 12695: 12690: 12684: 12681: 12678: 12675: 12649: 12644: 12638: 12633: 12628: 12623: 12616: 12611: 12606: 12601: 12594: 12589: 12584: 12579: 12572: 12567: 12562: 12557: 12551: 12546: 12543: 12529: 12526: 12513: 12508: 12502: 12495: 12488: 12482: 12477: 12470: 12466: 12454: 12449: 12443: 12440: 12433: 12426: 12420: 12415: 12408: 12404: 12392: 12387: 12379: 12376: 12367: 12364: 12357: 12351: 12346: 12339: 12335: 12318: 12316: 12307: 12297: 12287: 12281: 12268: 12262: 12259: 12256: 12247: 12244: 12241: 12232: 12229: 12226: 12220: 12214: 12211: 12208: 12205: 12191: 12186: 12173: 12168: 12162: 12157: 12152: 12145: 12140: 12135: 12128: 12123: 12118: 12112: 12107: 12104: 12095: 12093: 12089: 12088: 12076: 12073: 12060: 12055: 12049: 12042: 12035: 12029: 12024: 12017: 12013: 12001: 11996: 11990: 11983: 11976: 11970: 11965: 11958: 11954: 11942: 11937: 11931: 11924: 11917: 11911: 11906: 11899: 11895: 11878: 11876: 11867: 11857: 11847: 11841: 11828: 11822: 11819: 11816: 11807: 11804: 11801: 11792: 11789: 11786: 11780: 11774: 11771: 11768: 11765: 11751: 11746: 11733: 11728: 11722: 11717: 11712: 11705: 11700: 11695: 11688: 11683: 11678: 11672: 11667: 11664: 11656: 11655: 11644: 11631: 11626: 11619: 11615: 11604: 11597: 11593: 11574: 11567: 11541: 11533: 11529: 11521: 11517: 11511: 11505: 11499: 11492: 11488: 11450: 11442: 11438: 11430: 11426: 11420: 11414: 11408: 11401: 11397: 11381: 11376: 11363: 11358: 11350: 11346: 11336: 11332: 11324: 11318: 11313: 11308: 11304: 11300: 11295: 11289: 11280: 11276: 11266: 11262: 11255: 11250: 11245: 11237: 11233: 11223: 11219: 11211: 11205: 11200: 11180: 11175: 11167: 11163: 11153: 11149: 11141: 11135: 11130: 11125: 11121: 11117: 11112: 11106: 11097: 11093: 11083: 11079: 11072: 11067: 11062: 11054: 11050: 11040: 11036: 11028: 11022: 11017: 11008: 10995: 10990: 10986: 10982: 10977: 10972: 10968: 10963: 10958: 10954: 10950: 10945: 10940: 10936: 10931: 10928: 10925: 10920: 10916: 10910: 10906: 10896: 10883: 10878: 10872: 10865: 10858: 10852: 10847: 10844: 10841: 10836: 10830: 10823: 10816: 10810: 10805: 10800: 10794: 10787: 10780: 10774: 10769: 10758: 10753: 10738: 10735: 10732: 10727: 10723: 10713: 10697: 10671: 10667: 10661: 10658: 10653: 10650: 10645: 10642: 10637: 10632: 10628: 10624: 10622: 10615: 10611: 10601: 10597: 10591: 10588: 10583: 10580: 10575: 10572: 10570: 10563: 10559: 10551: 10548: 10546: 10539: 10535: 10522: 10517: 10504: 10499: 10493: 10488: 10483: 10476: 10471: 10466: 10459: 10454: 10449: 10443: 10438: 10435: 10428: 10425:Consider the 10418: 10392: 10386: 10381: 10376: 10370: 10334: 10328: 10323: 10320: 10315: 10309: 10274: 10268: 10263: 10258: 10252: 10240: 10235: 10218: 10215: 10212: 10209: 10206: 10201: 10197: 10193: 10190: 10185: 10181: 10177: 10174: 10164: 10161: 10155: 10152: 10149: 10140: 10137: 10134: 10118: 10115: 10112: 10106: 10104: 10096: 10091: 10085: 10082: 10079: 10074: 10069: 10062: 10057: 10054: 10051: 10046: 10039: 10034: 10029: 10026: 10023: 10017: 10012: 10008: 10002: 9996: 9991: 9986: 9979: 9974: 9969: 9962: 9957: 9952: 9946: 9941: 9938: 9933: 9927: 9922: 9917: 9910: 9905: 9900: 9893: 9888: 9883: 9877: 9871: 9867: 9865: 9857: 9854: 9851: 9848: 9830: 9825: 9812: 9807: 9801: 9796: 9791: 9784: 9779: 9774: 9767: 9762: 9757: 9751: 9746: 9743: 9729: 9725: 9718: 9713: 9707: 9703: 9697: 9693: 9688: 9686: 9682: 9677: 9662: 9656: 9649: 9643: 9638: 9633: 9625: 9621: 9611: 9607: 9600: 9595: 9590: 9587: 9584: 9566: 9559: 9554: 9537: 9534: 9532: 9525: 9521: 9517: 9514: 9509: 9505: 9501: 9494: 9491: 9488: 9486: 9479: 9475: 9471: 9468: 9463: 9459: 9455: 9452: 9443: 9437: 9430: 9424: 9419: 9414: 9406: 9402: 9392: 9388: 9381: 9374: 9368: 9365: 9360: 9353: 9348: 9345: 9339: 9334: 9332: 9325: 9322: 9319: 9306: 9303: 9300: 9297: 9282: 9281: 9274: 9268: 9266: 9262: 9244: 9238: 9235: 9228: 9222: 9217: 9212: 9204: 9200: 9196: 9187: 9183: 9176: 9171: 9166: 9163: 9160: 9142: 9135: 9130: 9117: 9114: 9109: 9105: 9101: 9098: 9093: 9089: 9085: 9064: 9058: 9051: 9045: 9040: 9035: 9027: 9023: 9013: 9009: 9002: 8995: 8989: 8984: 8977: 8972: 8966: 8961: 8956: 8953: 8950: 8937: 8934: 8931: 8920: 8919: 8912: 8906: 8904: 8898: 8891: 8885: 8868: 8862: 8859: 8856: 8847: 8844: 8841: 8835: 8833: 8823: 8819: 8815: 8812: 8809: 8806: 8803: 8800: 8798: 8788: 8782: 8779: 8776: 8771: 8764: 8759: 8756: 8753: 8747: 8742: 8738: 8732: 8726: 8721: 8714: 8709: 8703: 8698: 8695: 8690: 8684: 8679: 8672: 8667: 8661: 8655: 8651: 8649: 8641: 8638: 8635: 8632: 8614: 8609: 8607: 8604: − 8603: 8599: 8595: 8594: 8589: 8584: 8571: 8566: 8560: 8555: 8548: 8543: 8537: 8532: 8529: 8517: 8511: 8507: 8501: 8497: 8480: 8472: 8467: 8460: 8455: 8447: 8438: 8433: 8419: 8396:. A value of 8363: 8354: 8333: 8317: 8309: 8303: 8293: 8291: 8287: 8283: 8279: 8275: 8271: 8266: 8264: 8260: 8256: 8252: 8248: 8244: 8240: 8236: 8232: 8227: 8223: 8218: 8214: 8210: 8207: 8203: 8199: 8194: 8192: 8188: 8185:. The matrix 8184: 8183: 8178: 8174: 8170: 8166: 8162: 8144: 8138: 8135: 8132: 8127: 8124: 8120: 8112: 8111: 8110: 8108: 8089: 8084: 8081: 8077: 8070: 8067: 8064: 8057: 8056: 8055: 8053: 8049: 8030: 8024: 8021: 8018: 8015: 8008: 8007: 8006: 8004: 8001:th column of 8000: 7995: 7975: 7970: 7962: 7950: 7946: 7940: 7933: 7921: 7917: 7909: 7897: 7893: 7886: 7881: 7878: 7875: 7868: 7867: 7866: 7864: 7860: 7856: 7852: 7848: 7829: 7824: 7816: 7804: 7797: 7783: 7770: 7765: 7762: 7755: 7754: 7753: 7751: 7747: 7743: 7740: 7739:square matrix 7735: 7731: 7724: 7717: 7712: 7708: 7701: 7694: 7690: 7686: 7682: 7676: 7666: 7652: 7632: 7604: 7575: 7554: 7546: 7545: 7539: 7526: 7509: 7506: 7481: 7460: 7440: 7432: 7416: 7396: 7393: 7390: 7370: 7350: 7341: 7328: 7320: 7317: 7314: 7289: 7281: 7278:vectors that 7277: 7272: 7259: 7251: 7248: 7240: 7232: 7231: 7214: 7194: 7191: 7188: 7180: 7176: 7172: 7165: 7132: 7128: 7121: 7118: 7115: 7112: 7104: 7100: 7093: 7067: 7061: 7041: 7018: 7015: 7010: 7006: 7002: 6999: 6996: 6993: 6990: 6985: 6981: 6957: 6954: 6951: 6948: 6923: 6920: 6897: 6894: 6889: 6885: 6881: 6878: 6875: 6872: 6869: 6864: 6860: 6836: 6816: 6813: 6810: 6785: 6781: 6777: 6774: 6771: 6766: 6762: 6738: 6735: 6732: 6712: 6704: 6689: 6686: 6676: 6672: 6658: 6642: 6634: 6631: 6615: 6607: 6604: 6600: 6584: 6562: 6558: 6550: 6534: 6526: 6523: 6503: 6499: 6495: 6490: 6487: 6484: 6477: 6473: 6469: 6445: 6442: 6438: 6417: 6409: 6406: 6390: 6382: 6365: 6360: 6356: 6352: 6349: 6346: 6341: 6336: 6332: 6311: 6289: 6285: 6264: 6244: 6236: 6220: 6215: 6211: 6207: 6202: 6198: 6192: 6188: 6184: 6179: 6175: 6169: 6164: 6161: 6158: 6154: 6150: 6144: 6131: 6130: 6116: 6108: 6104: 6088: 6083: 6079: 6075: 6072: 6069: 6064: 6060: 6056: 6051: 6047: 6043: 6038: 6034: 6028: 6023: 6020: 6017: 6013: 6009: 6004: 6001: 5997: 5991: 5986: 5983: 5980: 5976: 5972: 5966: 5960: 5957: 5950: 5949: 5935: 5927: 5923: 5922: 5921: 5902: 5898: 5889: 5885: 5859: 5855: 5846: 5842: 5819: 5815: 5811: 5808: 5805: 5800: 5796: 5775: 5772: 5769: 5749: 5720: 5698: 5683: 5681: 5665: 5645: 5623: 5608: 5591: 5564: 5556: 5555: 5554: 5540: 5537: 5532: 5528: 5507: 5487: 5479: 5459: 5456: 5453: 5448: 5444: 5440: 5438: 5433: 5426: 5418: 5414: 5405: 5401: 5395: 5390: 5387: 5384: 5380: 5376: 5374: 5367: 5363: 5338: 5313: 5309: 5300: 5296: 5273: 5269: 5246: 5242: 5238: 5235: 5232: 5227: 5223: 5202: 5199: 5196: 5176: 5167: 5150: 5142: 5138: 5134: 5128: 5120: 5116: 5108:must satisfy 5095: 5070: 5062: 5058: 5049: 5046: 5043: 5017: 5014: 5011: 5008: 4982: 4959: 4956: 4953: 4950: 4941: 4935: 4932: 4929: 4926: 4900: 4897: 4894: 4891: 4871: 4868: 4865: 4862: 4842: 4822: 4799: 4796: 4793: 4790: 4784: 4781: 4778: 4772: 4769: 4766: 4763: 4740: 4737: 4734: 4709: 4701: 4697: 4692: 4688: 4668: 4665: 4660: 4656: 4652: 4649: 4629: 4609: 4586: 4578: 4574: 4570: 4567: 4544: 4536: 4532: 4511: 4489: 4479: 4476: 4471: 4461: 4436: 4428: 4424: 4412: 4409: 4405: 4400: 4386:eigenvectors 4385: 4367: 4359: 4355: 4331: 4323: 4319: 4315: 4309: 4301: 4297: 4287: 4274: 4271: 4265: 4257: 4253: 4249: 4243: 4235: 4231: 4227: 4224: 4216: 4210: 4197: 4191: 4188: 4185: 4182: 4176: 4173: 4170: 4167: 4164: 4158: 4150: 4146: 4137: 4133: 4129: 4125: 4121: 4117: 4113: 4109: 4105: 4101: 4097: 4078: 4070: 4066: 4058: 4054: 4050: 4046: 4041: 4039: 4035: 4031: 4028: 4024: 4020: 4017:. As long as 4016: 4010: 4007: 4003: 3999: 3996: 3992: 3986: 3982: 3979: 3973: 3968: 3964: 3959: 3955: 3949: 3945: 3941: 3937: 3933: 3929: 3923: 3919: 3915: 3908: 3904: 3900: 3895: 3891: 3887: 3883: 3879: 3874: 3858: 3843: 3839: 3835: 3831: 3828:. In general 3827: 3823: 3819: 3815: 3811: 3807: 3803: 3799: 3795: 3791: 3787: 3783: 3779: 3775: 3771: 3767: 3763: 3758: 3745: 3741: 3732: 3723: 3719: 3716: 3713: 3710: 3706: 3702: 3693: 3689: 3686: 3678: 3677: 3672: 3668: 3665: 3662:, define the 3661: 3657: 3653: 3649: 3639: 3637: 3632: 3628: 3623: 3619: 3614: 3610: 3605: 3601: 3596: 3592: 3587: 3583: 3579: 3574: 3570: 3565: 3561: 3556: 3552: 3547: 3530: 3527: 3524: 3520: 3515: 3511: 3507: 3501: 3497: 3491: 3486: 3483: 3480: 3476: 3472: 3470: 3463: 3459: 3451: 3448: 3445: 3437: 3433: 3424: 3420: 3416: 3414: 3409: 3397: 3393: 3392: 3387: 3383: 3379: 3374: 3361: 3351: 3347: 3338: 3334: 3325: 3322: 3317: 3313: 3306: 3296: 3292: 3283: 3279: 3270: 3267: 3262: 3258: 3244: 3240: 3231: 3227: 3218: 3215: 3210: 3206: 3199: 3193: 3190: 3187: 3184: 3170: 3166: 3162: 3158: 3157: 3152: 3148: 3144: 3140: 3135: 3133: 3128: 3124: 3120: 3116: 3112: 3107: 3103: 3098: 3094: 3091: 3087: 3083: 3079: 3074: 3070: 3060: 3058: 3053: 3051: 3050: 3039: 3036: 3032: 3028: 3023: 3021: 3017: 3013: 3009: 3005: 3000: 2995: 2982: 2977: 2971: 2964: 2958: 2953: 2948: 2945: 2942: 2931: 2926: 2920: 2917: 2910: 2904: 2899: 2894: 2891: 2888: 2854: 2845: 2841: 2838: 2835: 2832: 2828: 2818: 2814: 2801: 2788: 2783: 2779: 2775: 2772: 2769: 2766: 2763: 2760: 2755: 2749: 2746: 2743: 2738: 2731: 2726: 2723: 2720: 2714: 2709: 2703: 2700: 2697: 2694: 2680: 2674: 2670: 2663: 2650: 2645: 2639: 2634: 2627: 2622: 2616: 2611: 2608: 2599: 2597: 2592: 2588: 2581: 2574: 2569: 2565: 2556: 2549: 2547: 2533: 2527: 2524: 2519: 2515: 2508: 2502: 2499: 2494: 2490: 2480: 2477: 2472: 2468: 2461: 2455: 2452: 2449: 2446: 2433: 2432: 2429: 2427: 2423: 2419: 2415: 2411: 2407: 2403: 2398: 2396: 2392: 2388: 2384: 2383: 2378: 2374: 2373: 2368: 2364: 2360: 2356: 2352: 2348: 2344: 2340: 2336: 2332: 2331: 2326: 2317: 2310: 2308: 2294: 2291: 2285: 2282: 2279: 2276: 2263: 2262: 2259: 2257: 2253: 2247: 2243: 2237: 2233: 2230: 2226: 2225: 2218: 2208: 2206: 2202: 2182: 2175: 2173: 2159: 2151: 2142: 2138: 2135: 2132: 2129: 2125: 2117: 2116: 2113: 2111: 2110: 2104: 2098: 2094: 2093: 2088: 2076: 2071: 2061: 2054: 2052: 2038: 2030: 2027: 2019: 2011: 2004: 2003: 2000: 1989: 1976: 1971: 1967: 1961: 1958: 1954: 1948: 1943: 1940: 1937: 1933: 1929: 1924: 1920: 1914: 1911: 1907: 1903: 1900: 1897: 1892: 1888: 1882: 1879: 1875: 1871: 1866: 1862: 1856: 1853: 1849: 1845: 1840: 1836: 1813: 1805: 1801: 1793: 1784: 1780: 1770: 1766: 1759: 1754: 1749: 1741: 1737: 1729: 1720: 1716: 1706: 1702: 1695: 1688: 1680: 1677: 1673: 1667: 1660: 1657: 1653: 1645: 1642: 1638: 1630: 1625: 1620: 1615: 1606: 1603: 1599: 1593: 1586: 1582: 1574: 1570: 1560: 1557: 1553: 1547: 1540: 1536: 1528: 1524: 1517: 1495: 1487: 1479: 1454: 1438: 1435: 1430: 1427: 1424: 1415: 1402: 1394: 1391: 1374: 1370: 1366: 1361: 1348: 1343: 1337: 1334: 1327: 1320: 1317: 1311: 1306: 1287: 1281: 1274: 1271: 1264: 1258: 1253: 1228: 1224: 1220: 1216: 1211: 1207: 1202: 1198: 1188: 1186: 1182: 1178: 1174: 1170: 1165: 1163: 1159: 1155: 1151: 1147: 1146:David Hilbert 1142: 1140: 1136: 1132: 1128: 1124: 1123: 1118: 1113: 1111: 1107: 1103: 1099: 1095: 1091: 1087: 1083: 1078: 1076: 1072: 1068: 1064: 1060: 1059: 1054: 1050: 1049:heat equation 1047:to solve the 1046: 1042: 1037: 1035: 1034: 1029: 1025: 1021: 1017: 1012: 1010: 1006: 1002: 998: 993: 991: 987: 983: 982:matrix theory 979: 966: 962: 958: 954: 950: 947: 943: 939: 935: 931: 928: 924: 923: 922: 920: 915: 913: 912:diagonalizing 909: 905: 901: 885: 877: 874: 866: 858: 854: 850: 846: 842: 838: 822: 817: 814: 810: 806: 803: 798: 795: 791: 784: 781: 777: 767: 747: 744: 740: 729: 724: 721: 717: 716:shear mapping 713: 703: 695: 694:shear mapping 690: 686: 684: 680: 676: 672: 668: 667:eigenequation 664: 648: 640: 637: 623: 615: 611: 607: 603: 599: 594: 592: 588: 584: 580: 576: 572: 568: 564: 563: 558: 554: 550: 549: 544: 540: 539: 528: 526: 521: 519: 515: 511: 509: 504: 501: 497: 492: 473: 470: 462: 424: 373: 327: 324: 278: 274: 270: 256: 254: 250: 246: 242: 237: 234: 230: 226: 222: 218: 214: 200: 192: 188: 184: 163: 160: 152: 132: 124: 108: 78: 74: 70: 66: 65: 56: 35: 31: 26: 22: 25416: 25404: 25392: 25373: 25306:Optimization 25168:Differential 25092:Differential 25059:Order theory 25054:Graph theory 24958:Group theory 24715:Vector space 24516: 24447:Vector space 24365:James Demmel 24343: 24335: 24259: 24250: 24235:by removing 24222: 24185: 24167: 24154: 24136: 24098: 24094: 24059: 24055: 24038: 24025:. Retrieved 24021: 24005:. Retrieved 24001: 23998:"Eigenvalue" 23985:. Retrieved 23981: 23928: 23924: 23896: 23864: 23860: 23842: 23799: 23795: 23773: 23755: 23731: 23713: 23693: 23676: 23672: 23646: 23618: 23614: 23596: 23578: 23568: 23557: 23538: 23534: 23502: 23496: 23478: 23453: 23435: 23431: 23413: 23407: 23385: 23343: 23339: 23296:(1): 31–58. 23293: 23289: 23262: 23243:, New York: 23240: 23231: 23172: 23168: 23154: 23129: 23105: 23097: 23071: 23059: 23047: 23035: 23026: 23016: 23004: 22992: 22980: 22968: 22941: 22917:, p. 189 §8. 22910: 22898: 22879: 22867: 22855: 22843: 22831: 22819: 22792: 22780: 22768: 22756: 22744: 22717: 22688: 22676: 22660: 22654: 22645: 22639: 22627: 22615: 22603: 22596:Francis 1961 22591: 22584:Aldrich 2006 22579: 22567: 22555: 22543: 22516: 22509:Hawkins 1975 22490:Hawkins 1975 22485: 22454: 22442: 22430:. Retrieved 22426: 22402: 22359: 22352: 22340: 22253: 22225: 22203: 22190: 22178: 22170: 22166: 22164:From p. 827: 22159: 22155: 22147: 22139:pp. 225–226. 22134: 22130: 22119: 22115: 22107: 22096: 22088: 22076: 22017:Eigenmoments 21988: 21986: 21955: 21944:brightnesses 21937: 21777: 21518:compass rose 21316: 21308:glacial till 21301: 21286: 21277: 21261: 21192:theory, the 21190:Hartree–Fock 21175: 20971: 20801: 20764: 20657: 20560: 20532:wavefunction 20474: 20393: 20305:bound states 20270: 20234: 20218: 20211: 19905:dimensions, 19884: 19861: 19766: 19756: 19724:Markov chain 19721: 19707:Markov chain 19684: 19433: 19361: 19294: 19264: 19246: 19205:, where the 19181: 19086:centered at 19065: 18966:discriminant 18959: 16641: 16633:Applications 16627: 16604:QR algorithm 16601: 16568:denotes the 16538: 16422: 16336: 16165: 16014: 15828: 15680: 15615: 15612:Eigenvectors 15527: 15458: 15409: 15397: 15389: 15196:of the form 15191: 15040: 14964: 14843: 14841: 14698: 14697:in terms of 14694: 14692: 14559: 14544: 14539: 14535: 14529: 14519:acting on a 14510: 14490: 14486: 14482: 14478: 14469: 14464: 14460: 14456: 14452: 14448: 14440: 14436: 14432: 14428: 14426: 14410: 14406: 14402: 14398: 14394: 14390: 14386: 14382: 14378: 14374: 14370: 14362: 14360: 14355: 14351: 14347: 14343: 14335: 14333: 14328: 14323: 14319: 14315: 14311: 14307: 14302: 14298: 14295: 14293: 14288: 14284: 14280: 14276: 14272: 14268: 14264: 14261: 14257: 14253: 14249: 14245: 14241: 14237: 14233: 14231: 14100: 14096: 14092: 14088: 14084: 14080: 14076: 14072: 14068: 14064: 14060: 14056: 14054: 13916: 13911: 13907: 13903: 13899: 13895: 13891: 13889: 13816: 13814: 13804: 13800: 13796: 13793: 13789: 13785: 13781: 13777: 13773: 13769: 13765: 13761: 13757: 13755: 13744: 13687: 13683: 13679: 13675: 13671: 13667: 13665: 13626: 13622: 13618: 13610: 13603: 13597: 13585: 13580: 13576: 13572: 13501: 13497: 13493: 13491: 13390: 13380: 13376: 13374: 13317: 13313: 13305: 13301: 13290:Banach space 13281: 13279: 13259: 13057:minor matrix 13052: 13046: 13035: 13031: 12904: 12902: 12897: 12893: 12888: 12884: 12880: 12878: 12535: 12527: 12319: 12314: 12305: 12295: 12285: 12282: 12189: 12187: 12096: 12091: 12084: 12082: 12074: 11879: 11874: 11865: 11855: 11845: 11842: 11749: 11747: 11652: 11650: 11572: 11565: 11379: 11377: 11009: 10897: 10756: 10754: 10520: 10518: 10424: 10238: 10236: 9828: 9826: 9735: 9723: 9716: 9711: 9705: 9701: 9695: 9691: 9689: 9684: 9680: 9678: 9564: 9557: 9555: 9278: 9277:, equation ( 9272: 9269: 9264: 9260: 9140: 9133: 9131: 8916: 8915:, equation ( 8910: 8907: 8902: 8896: 8889: 8886: 8612: 8610: 8605: 8601: 8597: 8591: 8587: 8585: 8521: 8509: 8505: 8499: 8495: 8436: 8305: 8281: 8267: 8262: 8258: 8254: 8250: 8246: 8242: 8238: 8234: 8230: 8225: 8221: 8216: 8212: 8208: 8205: 8201: 8197: 8195: 8190: 8186: 8180: 8176: 8172: 8167:and it is a 8160: 8159: 8106: 8104: 8051: 8047: 8045: 8002: 7998: 7993: 7990: 7862: 7858: 7854: 7850: 7846: 7844: 7749: 7745: 7741: 7733: 7729: 7722: 7715: 7710: 7706: 7699: 7692: 7688: 7684: 7680: 7678: 7542: 7540: 7430: 7342: 7279: 7275: 7273: 7228: 7178: 7177:vector that 7174: 7170: 7167: 6605:real matrix. 6257:th power of 5741: 5679: 5168: 4524:whose first 4454:, such that 4288: 4214: 4211: 4135: 4131: 4127: 4123: 4119: 4115: 4111: 4107: 4103: 4099: 4095: 4056: 4052: 4048: 4044: 4042: 4037: 4033: 4029: 4026: 4022: 4018: 4008: 4005: 4001: 3997: 3994: 3990: 3984: 3980: 3977: 3971: 3966: 3962: 3957: 3947: 3943: 3939: 3935: 3931: 3927: 3921: 3917: 3913: 3906: 3902: 3898: 3893: 3889: 3885: 3877: 3875: 3841: 3833: 3829: 3825: 3821: 3817: 3813: 3809: 3805: 3801: 3797: 3793: 3789: 3781: 3777: 3773: 3769: 3765: 3759: 3674: 3670: 3666: 3659: 3655: 3651: 3647: 3645: 3635: 3630: 3626: 3621: 3617: 3612: 3608: 3603: 3599: 3594: 3590: 3585: 3581: 3577: 3572: 3568: 3567:) = 1, then 3563: 3559: 3554: 3550: 3548: 3395: 3389: 3385: 3381: 3377: 3375: 3168: 3164: 3160: 3154: 3150: 3146: 3142: 3138: 3136: 3126: 3122: 3118: 3114: 3105: 3101: 3096: 3092: 3089: 3085: 3081: 3077: 3072: 3068: 3066: 3054: 3047: 3045: 3024: 3015: 3007: 2998: 2996: 2816: 2812: 2802: 2678: 2672: 2668: 2664: 2600: 2595: 2590: 2586: 2579: 2572: 2567: 2563: 2561: 2550: 2425: 2417: 2413: 2409: 2405: 2399: 2394: 2390: 2386: 2380: 2379:. Equation ( 2376: 2370: 2366: 2362: 2358: 2355:coefficients 2350: 2346: 2338: 2328: 2322: 2311: 2255: 2251: 2245: 2241: 2228: 2222: 2220: 2204: 2187: 2176: 2107: 2105: 2096: 2090: 2086: 2074: 2069: 2066: 2055: 1990: 1455: 1416: 1362: 1232: 1226: 1222: 1218: 1214: 1204: 1177:QR algorithm 1173:power method 1166: 1157: 1143: 1120: 1114: 1079: 1056: 1038: 1031: 1027: 1023: 1013: 994: 975: 964: 960: 952: 945: 941: 937: 933: 926: 918: 916: 903: 899: 856: 852: 848: 844: 840: 836: 725: 719: 709: 678: 670: 666: 662: 613: 609: 605: 601: 597: 595: 571:rigid bodies 560: 546: 536: 534: 522: 510:-dimensional 507: 499: 495: 493: 366:(denoted by 263:Consider an 262: 253:steady state 238: 215: 190: 186: 182: 68: 33: 27: 25: 25418:WikiProject 25261:Game theory 25241:Probability 24978:Homological 24968:Multilinear 24948:Commutative 24925:Type theory 24892:Foundations 24848:mathematics 24695:Multivector 24660:Determinant 24617:Dot product 24462:Linear span 24299:3Blue1Brown 24141:Brady Haran 24027:27 November 22888:Shilov 1977 22884:Nering 1970 22874:, p. 186 §8 22785:Nering 1970 22761:Nering 1970 22478:Nering 1970 22395:Nering 1970 22243:Beezer 2006 22235:Shilov 1977 22195:From p. 51: 21989:eigenvoices 21220:method. In 20563:bound state 20497:Hamiltonian 20380:measurement 20243:define the 19927:mass matrix 19330:due to its 19082:PCA of the 17063:polynomial 16340:A variation 16166:The matrix 15604:. Even the 15474:determinant 15406:Eigenvalues 15380:Calculation 13676:eigenvector 13506:integrating 8921:) becomes, 7173:, namely a 6751:matrix and 6383:The matrix 6107:determinant 5609:A basis of 4384:orthonormal 4015:commutative 3117:such that ( 3035:real matrix 2562:where each 2236:determinant 2075:eigenvector 1100:. Finally, 1090:unit circle 1088:lie on the 927:eigensystem 673:may be any 221:dimensional 34:eigenvector 25434:Categories 25246:Statistics 25125:Arithmetic 25087:Arithmetic 24953:Elementary 24920:Set theory 24729:Direct sum 24564:Invertible 24467:Linear map 24062:: 91–134. 23809:1702.05395 23621:(3): 243, 23303:1908.03795 23182:2004.12167 23134:, Boston: 22915:Roman 2008 22872:Roman 2008 22722:Anton 1987 22632:Meyer 2000 22572:Kline 1972 22560:Kline 1972 22548:Kline 1972 22536:Kline 1972 22521:Kline 1972 22241:, p. 364; 22237:, p. 109; 22231:Roman 2008 22152:Kline 1972 22012:Eigenplane 21974:biometrics 21972:branch of 21957:eigenfaces 21926:Eigenfaces 21917:Eigenfaces 21226:orthogonal 20981:microwaves 20866:observable 20802:eigenstate 20249:rigid body 19925:becomes a 19687:centrality 19197:yields an 19172:See also: 18187:Geometric 17851:Algebraic 15713:, that is 14445:one-to-one 14399:eigenbasis 14397:called an 14340:direct sum 13900:eigenspace 13766:eigenvalue 13690:such that 13617:, and let 9283:) becomes 7162:See also: 6405:invertible 5680:eigenbasis 4094:. Because 3896:, written 3814:eigenspace 2335:polynomial 2323:Using the 2221:Equation ( 2106:Equation ( 2087:eigenvalue 1379:such that 1195:See also: 1028:eigenvalue 1001:rigid body 965:eigenbasis 938:eigenspace 317:of length 259:Definition 219:are multi- 183:eigenvalue 25173:Geometric 25163:Algebraic 25102:Euclidean 25077:Algebraic 24973:Universal 24759:Numerical 24522:Transpose 24317:× 24237:excessive 24125:1874/2663 24007:19 August 23953:1539-4794 23911:1401.4580 23889:129658242 23834:119330480 23527:128825838 23361:1874/8051 23320:213918682 23223:216553547 23207:0031-9007 22862:, p. 217. 22523:, p. 673. 22432:19 August 22333:Citations 22257:By doing 22102:In 1755, 22093:On p. 212 21934:Eigenface 21407:≥ 21394:≥ 21229:basis set 21214:iteration 21144:τ 21111:τ 21082:† 21055:τ 21028:† 20985:scattered 20952:⟩ 20943:Ψ 20897:⟩ 20888:Ψ 20788:⟩ 20779:Ψ 20750:⟩ 20741:Ψ 20726:⟩ 20717:Ψ 20685:⟩ 20676:Ψ 20617:ψ 20608:in which 20606:basis set 20574:ψ 20512:ψ 20453:ψ 20437:ψ 20358:… 20237:mechanics 20175:ω 20160:ω 20112:˙ 20094:¨ 20033:ω 20007:ω 19974:ω 19842:− 19833:¨ 19786:¨ 19753:Vibration 19592:⁡ 19526:− 19513:, and in 19436:), where 19407:− 19383:− 19375:− 19345:− 19265:practical 19253:data sets 19188:symmetric 19051:θ 19048:⁡ 19039:± 19036:θ 19033:⁡ 18996:θ 18993:⁡ 18981:− 18928:− 18694:− 18487:γ 18463:γ 18425:γ 18383:γ 18359:γ 18313:γ 18289:γ 18251:γ 18220:λ 18213:γ 18201:γ 18151:μ 18127:μ 18089:μ 18047:μ 18023:μ 17977:μ 17953:μ 17915:μ 17884:λ 17877:μ 17865:μ 17831:φ 17828:⁡ 17822:− 17819:φ 17816:⁡ 17798:φ 17795:− 17774:λ 17766:φ 17763:⁡ 17754:φ 17751:⁡ 17733:φ 17712:λ 17674:λ 17661:λ 17635:θ 17632:⁡ 17623:− 17620:θ 17617:⁡ 17599:θ 17593:− 17572:λ 17564:θ 17561:⁡ 17549:θ 17546:⁡ 17528:θ 17504:λ 17451:λ 17420:λ 17382:λ 17369:λ 17341:λ 17310:λ 17304:φ 17298:⁡ 17289:− 17280:λ 17245:− 17242:λ 17209:λ 17203:θ 17197:⁡ 17188:− 17179:λ 17144:− 17141:λ 17122:− 17119:λ 17082:− 17079:λ 17037:φ 17034:⁡ 17026:φ 17023:⁡ 17013:φ 17010:⁡ 17002:φ 16999:⁡ 16905:θ 16902:⁡ 16894:θ 16891:⁡ 16881:θ 16878:⁡ 16872:− 16867:θ 16864:⁡ 16612:Hermitian 16554:∗ 16514:∗ 16492:∗ 16476:λ 16402:∈ 16399:μ 16371:− 16360:μ 16357:− 16269:− 16194:λ 16145:λ 15978:− 15943:− 15789:⋅ 15580:of order 15528:Explicit 15487:× 15441:× 15309:⋯ 15295:− 15271:− 15252:− 15163:λ 15146:⋯ 15129:λ 15073:λ 15065:… 15052:λ 15008:− 14995:⋯ 14963:giving a 14937:− 14912:− 14895:… 14881:− 14862:− 14808:− 14805:λ 14797:− 14786:− 14783:⋯ 14780:− 14772:− 14765:λ 14751:− 14743:− 14736:λ 14722:− 14713:λ 14670:− 14646:⋯ 14635:− 14606:− 14493:) has no 14443:) is not 14344:different 14289:eigenline 14252:, namely 14232:So, both 14203:α 14197:λ 14179:α 14144:λ 14091:, namely 14020:α 14002:α 13863:λ 13720:λ 13646:→ 13586:The main 13551:λ 13463:λ 13349:λ 13256:submatrix 13199:λ 13195:− 13186:λ 13173:≠ 13166:∏ 13134:λ 13130:− 13121:λ 13107:∏ 12934:− 12852:λ 12849:− 12830:λ 12827:− 12807:λ 12804:− 12774:λ 12771:− 12741:λ 12738:− 12708:λ 12705:− 12682:λ 12679:− 12467:λ 12441:− 12405:λ 12365:− 12336:λ 12263:λ 12260:− 12248:λ 12245:− 12233:λ 12230:− 12212:λ 12209:− 12014:λ 11955:λ 11896:λ 11823:λ 11820:− 11808:λ 11805:− 11793:λ 11790:− 11772:λ 11769:− 11627:∗ 11616:λ 11594:λ 11530:λ 11518:λ 11489:λ 11439:λ 11427:λ 11398:λ 11347:λ 11333:λ 11314:⋅ 11305:λ 11277:λ 11263:λ 11234:λ 11220:λ 11164:λ 11150:λ 11131:⋅ 11122:λ 11094:λ 11080:λ 11051:λ 11037:λ 10987:λ 10969:λ 10955:λ 10937:λ 10917:λ 10907:λ 10848:⋅ 10736:− 10659:− 10646:− 10638:∗ 10629:λ 10612:λ 10576:− 10560:λ 10536:λ 10321:− 10213:λ 10207:− 10198:λ 10182:λ 10178:− 10162:− 10156:λ 10153:− 10141:λ 10138:− 10119:λ 10116:− 10086:λ 10083:− 10058:λ 10055:− 10030:λ 10027:− 9942:λ 9939:− 9855:λ 9852:− 9585:λ 9515:− 9453:− 9366:− 9346:− 9320:λ 9301:− 9236:− 9197:− 9161:λ 8951:λ 8935:− 8860:− 8857:λ 8845:− 8842:λ 8820:λ 8813:λ 8807:− 8783:λ 8780:− 8760:λ 8757:− 8699:λ 8696:− 8639:λ 8636:− 8308:Hermitian 8270:defective 8142:Λ 8125:− 8082:− 8074:Λ 8028:Λ 7947:λ 7941:⋯ 7918:λ 7894:λ 7805:⋯ 7510:κ 7461:κ 7394:× 7351:κ 7321:κ 7252:λ 7192:× 7129:λ 7116:… 7101:λ 7019:α 7007:λ 7000:… 6994:α 6982:λ 6949:α 6924:∈ 6921:α 6886:λ 6879:… 6861:λ 6782:λ 6775:… 6763:λ 6736:× 6673:λ 6603:symmetric 6599:Hermitian 6563:∗ 6500:λ 6488:… 6474:λ 6443:− 6357:λ 6350:… 6333:λ 6212:λ 6208:⋯ 6199:λ 6189:λ 6176:λ 6155:∏ 6080:λ 6073:⋯ 6061:λ 6048:λ 6035:λ 6014:∑ 5977:∑ 5961:⁡ 5899:λ 5886:μ 5856:λ 5843:μ 5816:λ 5809:… 5797:λ 5773:× 5529:γ 5454:≤ 5445:γ 5441:≤ 5415:λ 5402:γ 5381:∑ 5364:γ 5310:λ 5297:γ 5270:λ 5243:λ 5236:… 5224:λ 5200:≤ 5151:λ 5139:γ 5135:≥ 5129:λ 5117:μ 5096:λ 5071:λ 5059:γ 5050:λ 5047:− 5044:ξ 5015:ξ 5012:− 4957:ξ 4954:− 4933:ξ 4930:− 4898:ξ 4895:− 4869:ξ 4866:− 4797:ξ 4794:− 4770:ξ 4767:− 4738:ξ 4735:− 4710:λ 4698:γ 4689:λ 4587:λ 4575:γ 4571:− 4545:λ 4533:γ 4480:λ 4437:λ 4425:γ 4410:… 4368:λ 4356:γ 4332:λ 4320:μ 4316:≤ 4310:λ 4298:γ 4272:≤ 4266:λ 4254:μ 4250:≤ 4244:λ 4232:γ 4228:≤ 4189:λ 4186:− 4177:⁡ 4171:− 4159:λ 4147:γ 4079:λ 4067:γ 3717:λ 3714:− 3512:λ 3498:μ 3477:∑ 3460:μ 3446:≤ 3434:λ 3421:μ 3417:≤ 3348:λ 3335:μ 3326:λ 3323:− 3314:λ 3307:⋯ 3293:λ 3280:μ 3271:λ 3268:− 3259:λ 3241:λ 3228:μ 3219:λ 3216:− 3207:λ 3191:λ 3188:− 2943:λ 2918:− 2889:λ 2839:λ 2836:− 2780:λ 2773:λ 2767:− 2750:λ 2747:− 2727:λ 2724:− 2701:λ 2698:− 2528:λ 2525:− 2516:λ 2509:⋯ 2503:λ 2500:− 2491:λ 2481:λ 2478:− 2469:λ 2453:λ 2450:− 2420:, can be 2283:λ 2280:− 2136:λ 2133:− 2095:) is the 2031:λ 1934:∑ 1901:⋯ 1794:⋮ 1730:⋮ 1668:⋯ 1631:⋮ 1626:⋱ 1621:⋮ 1616:⋮ 1594:⋯ 1548:⋯ 1431:− 1425:λ 1395:λ 1373:collinear 1335:− 1318:− 1272:− 1233:Consider 1187:in 1961. 940:, or the 878:λ 815:λ 807:λ 796:λ 712:Mona Lisa 641:λ 555:with the 474:λ 275:× 229:stretches 201:λ 164:λ 133:λ 25394:Category 25150:Topology 25097:Discrete 25082:Analytic 25069:Geometry 25041:Discrete 24996:Calculus 24988:Analysis 24943:Abstract 24882:Glossary 24865:Timeline 24805:Category 24744:Subspace 24739:Quotient 24690:Bivector 24604:Bilinear 24546:Matrices 24421:Glossary 24143:for the 23987:4 August 23969:45359403 23961:17700768 23744:76091646 23541:: 1–29, 23477:(1996), 23378:22275430 23324:Archived 23215:33124845 22665:Archived 21996:See also 21946:of each 20309:electron 20281:diagonal 19695:PageRank 19160:variance 16663:Rotation 15924:that is 15462:accuracy 14099: ∈ 14071: ∈ 14063: ∈ 13792:, while 5169:Suppose 3049:spectrum 3018:are all 2422:factored 2341:and the 1369:parallel 1137:studied 1135:Poincaré 955:forms a 692:In this 531:Overview 518:matrices 417:, where 249:feedback 25406:Commons 25188:Applied 25158:General 24935:Algebra 24860:History 24416:Outline 24231:Please 24223:use of 24103:Bibcode 23933:Bibcode 23869:Bibcode 23814:Bibcode 23651:Bibcode 23623:Bibcode 23507:Bibcode 23370:2117040 23253:58-7924 23187:Bibcode 23085:Sources 22634:, §7.3. 22622:, §7.3. 21304:geology 21266:Please 21235:called 20257:inertia 19705:of the 19224:or the 16721:Matrix 16655:Scaling 14495:bounded 14405:. When 14103:, then 14095:, 14059:, 13764:is the 13615:scalars 13320:is the 13286:Hilbert 13254:is the 8306:In the 8177:similar 8005:. Then 7728:, ..., 7705:, ..., 7207:matrix 6829:(where 6657:unitary 5553:, then 4622:. Then 4120:nullity 3910:, then 3784:is the 3658:matrix 3650:of the 3084:matrix 2585:, ..., 2412:matrix 2389:or the 2333:) is a 2192:is the 2085:is the 1468:matrix 1213:Matrix 1127:Schwarz 1039:Later, 972:History 855:matrix 683:complex 557:English 553:cognate 425:, then 291:matrix 241:geology 225:rotates 25107:Finite 24963:Linear 24870:Future 24846:Major 24700:Tensor 24512:Kernel 24442:Vector 24437:Scalar 24350:Theory 24192: 24174: 23967: 23959: 23951: 23899:, SIAM 23887: 23849: 23832: 23780: 23762: 23742: 23720: 23701: 23661: 23603: 23585: 23525: 23485: 23460: 23396: 23376: 23368: 23318: 23271: 23251: 23221: 23213: 23205: 23142: 23116: 22080:Note: 21578:, and 21312:clasts 21194:atomic 21182:atomic 20979:, and 20864:is an 20800:is an 20765:where 20556:energy 20530:, the 20495:, the 20475:where 20388:proton 20370:) and 20307:of an 20277:stress 20275:, the 20253:tensor 20251:. The 19998:where 19691:Google 19622:. The 19551:, the 19291:Graphs 19275:; cf. 19207:sample 19195:matrix 19193:(PSD) 17236: 17073: 16617:, the 16539:where 14901: 14892: 14521:module 14365:is an 14271:, and 13674:is an 13504:) and 13300:. Let 13227:where 13047:For a 12892:= 4 = 12303:, and 12085:lower 11863:, and 10710:is an 10690:where 8284:has a 7343:where 7175:column 6324:, are 4913:, and 4815:since 3882:closed 3796:, and 3762:kernel 3088:. The 2353:. Its 2343:degree 2188:where 2073:is an 1154:German 1092:, and 919:eigen- 902:is an 675:scalar 589:, and 543:German 538:eigen- 451:, and 423:scalar 233:shears 73:vector 25334:lists 24877:Lists 24850:areas 24569:Minor 24554:Block 24492:Basis 24159:(PDF) 24091:(PDF) 24043:(PDF) 23965:S2CID 23906:arXiv 23885:S2CID 23830:S2CID 23804:arXiv 23736:Wiley 23523:S2CID 23374:S2CID 23327:(PDF) 23316:S2CID 23298:arXiv 23286:(PDF) 23219:S2CID 23177:arXiv 23110:Wiley 22511:, §3. 22492:, §2. 22364:(PDF) 22261:over 22182:See: 22068:Notes 21948:pixel 21067:, of 20973:Light 20311:in a 20285:shear 20247:of a 19364:) or 19301:graph 19259:. In 19186:of a 19135:0.478 19129:0.878 18964:with 18189:mult. 17853:mult. 14515:– an 14240:and α 13803:with 13625:into 13608:field 11010:Then 10714:with 7383:is a 7179:right 6725:is a 5926:trace 5520:. If 4138:) as 3840:, so 3786:union 3580:. If 2067:then 1158:eigen 1156:word 957:basis 730:like 720:along 706:them. 559:word 548:eigen 545:word 514:basis 421:is a 344:with 231:, or 189:, or 121:, is 71:is a 67:) or 64:-gən- 32:, an 24724:Dual 24579:Rank 24190:ISBN 24172:ISBN 24029:2019 24009:2020 23989:2019 23957:PMID 23949:ISSN 23847:ISBN 23778:ISBN 23760:ISBN 23740:LCCN 23718:ISBN 23699:ISBN 23659:ISBN 23601:ISBN 23583:ISBN 23483:ISBN 23458:ISBN 23394:ISBN 23366:PMID 23269:ISBN 23249:LCCN 23211:PMID 23203:ISSN 23140:ISBN 23114:ISBN 22434:2020 21742:> 21729:> 21689:> 21522:360° 21208:via 21196:and 21184:and 21135:and 20824:and 20658:The 20635:and 20503:and 20386:, a 20299:The 19929:and 19765:(or 19182:The 19176:and 17825:sinh 17813:cosh 17760:sinh 17748:cosh 17295:cosh 17031:cosh 17020:sinh 17007:sinh 16996:cosh 14538:and 14530:The 14294:The 14079:and 14067:and 14055:for 11571:and 11473:and 11193:and 10359:and 9721:and 9700:and 9270:For 8908:For 8894:and 7687:has 7453:and 7280:left 7083:are 6970:are 6460:are 6105:The 5924:The 5742:Let 5189:has 4174:rank 4122:of ( 4025:and 4000:) = 3983:) ∈ 3970:and 3938:) = 3920:) ∈ 3888:and 3145:and 3067:Let 3046:The 3010:are 2807:and 2408:-by- 2400:The 2234:the 2203:and 1995:and 1199:and 1183:and 988:and 914:it. 498:-by- 24239:or 24121:hdl 24111:doi 24099:123 24064:doi 24060:692 23941:doi 23877:doi 23822:doi 23681:doi 23631:doi 23543:doi 23515:doi 23440:doi 23418:doi 23356:hdl 23348:doi 23308:doi 23195:doi 23173:125 21938:In 21520:of 21302:In 21270:to 21176:In 21148:min 21115:max 20929:to 20804:of 20418:in 20271:In 20235:In 19885:In 19816:or 19693:'s 19589:deg 19295:In 19283:in 19271:of 19045:sin 19030:cos 18990:sin 17629:sin 17614:cos 17558:sin 17543:cos 17194:cos 16899:cos 16888:sin 16875:sin 16861:cos 16572:of 16423:If 14427:If 14369:of 13906:of 13902:or 13768:of 13678:of 13613:of 13296:on 13288:or 12670:det 12311:= 3 12301:= 2 12291:= 1 12200:det 12192:is 11871:= 3 11861:= 2 11851:= 1 11760:det 11752:is 10219:22. 9843:det 9831:is 9139:= − 8627:det 7857:by 7433:of 7276:row 7233:), 6705:If 6655:is 6635:If 6608:If 6597:is 6527:If 6410:If 6403:is 6139:det 6109:of 5928:of 5478:sum 5288:is 5003:det 4945:det 4921:det 3820:of 3816:or 3808:). 3679:), 3664:set 3654:by 3549:If 3398:as 3376:If 3179:det 3080:by 2809:λ=3 2805:λ=1 2689:det 2681:is 2441:det 2393:of 2375:of 2271:det 2196:by 1508:or 1464:by 1371:or 1296:and 1051:by 980:or 944:of 851:by 839:by 665:or 562:own 243:to 62:EYE 28:In 25436:: 24139:. 24135:. 24119:, 24109:, 24097:, 24093:, 24058:. 24054:. 24020:. 24000:. 23980:. 23963:. 23955:. 23947:. 23939:. 23929:32 23927:. 23923:. 23883:, 23875:, 23865:66 23863:, 23828:. 23820:. 23812:. 23800:89 23798:. 23794:. 23738:, 23675:, 23657:, 23629:, 23619:24 23617:, 23537:, 23521:, 23513:, 23503:25 23501:, 23473:; 23434:, 23412:, 23392:, 23372:, 23364:, 23354:, 23344:28 23342:, 23338:, 23322:. 23314:. 23306:. 23294:59 23292:. 23288:. 23247:, 23217:. 23209:. 23201:. 23193:. 23185:. 23171:. 23167:. 23138:, 23112:, 23025:. 22953:^ 22922:^ 22804:^ 22729:^ 22700:^ 22528:^ 22497:^ 22466:^ 22425:. 22414:^ 22387:^ 22372:^ 22158:, 22135:32 22133:, 21551:, 21429:; 21239:. 20975:, 20964:. 20558:. 20422:: 20263:. 20198:0. 20146:, 19949:a 19722:A 19287:. 16594:. 16323:. 16163:. 15402:. 15364:0. 14552:. 14527:. 14491:λI 14489:− 14461:λI 14459:− 14453:λI 14451:− 14441:λI 14439:− 14291:. 14267:∈ 14260:, 14256:+ 14236:+ 13914:. 13894:. 13807:. 13776:. 13686:∈ 13670:∈ 13629:, 13494:dt 13383:. 13059:, 12900:. 12317:. 12293:, 11877:. 11853:, 10210:35 10194:14 10165:16 9726:=3 9719:=1 9708:=3 9698:=1 9563:= 9275:=3 8913:=1 8905:. 8899:=3 8892:=1 8615:, 8606:λI 8512:=3 8502:=1 8439:= 8292:. 8226:PD 8224:= 8222:AP 8219:, 8209:AP 8109:, 8054:, 7994:ii 7752:, 7721:, 7698:, 5958:tr 5351:, 5166:. 4653::= 4217:. 4136:λI 4134:− 4128:λI 4126:− 4116:λI 4114:− 4104:λI 4102:− 4040:. 4021:+ 3965:∈ 3946:+ 3934:+ 3916:+ 3905:∈ 3901:, 3873:. 3806:λI 3804:− 3770:λI 3768:− 3638:. 3607:, 3380:= 3149:≤ 3130:) 3121:− 2673:λI 2671:− 2598:. 2578:, 2397:. 2246:λI 2244:− 2103:. 1587:22 1575:21 1541:12 1529:11 1472:, 1453:. 1439:20 1338:80 1328:60 1321:20 1125:. 1077:. 1061:. 1036:. 1007:. 992:. 697:1. 685:. 593:. 585:, 581:, 577:, 527:. 491:. 227:, 213:. 185:, 125:, 55:-/ 52:ən 46:aɪ 24839:e 24832:t 24825:v 24397:e 24390:t 24383:v 24320:n 24314:n 24266:) 24260:( 24255:) 24251:( 24247:. 24229:. 24147:. 24123:: 24113:: 24105:: 24072:. 24066:: 24031:. 24011:. 23991:. 23971:. 23943:: 23935:: 23914:. 23908:: 23879:: 23871:: 23836:. 23824:: 23816:: 23806:: 23707:. 23683:: 23677:1 23653:: 23633:: 23625:: 23545:: 23539:2 23517:: 23509:: 23442:: 23436:4 23420:: 23414:4 23358:: 23350:: 23310:: 23300:: 23225:. 23197:: 23189:: 23179:: 23078:. 23066:. 23029:. 22936:. 22838:. 22826:. 22814:. 22799:. 22610:. 22586:. 22461:. 22436:. 22409:. 22309:) 22304:4 22300:n 22296:( 22293:O 22273:n 22160:8 22116:t 21899:0 21895:R 21872:G 21868:t 21845:G 21841:t 21818:0 21814:R 21791:0 21787:R 21750:3 21746:E 21737:2 21733:E 21724:1 21720:E 21697:3 21693:E 21684:2 21680:E 21676:= 21671:1 21667:E 21644:3 21640:E 21636:= 21631:2 21627:E 21623:= 21618:1 21614:E 21591:3 21587:E 21564:2 21560:E 21537:1 21533:E 21502:3 21497:v 21473:2 21468:v 21444:1 21439:v 21415:3 21411:E 21402:2 21398:E 21389:1 21385:E 21362:3 21357:v 21352:, 21347:2 21342:v 21337:, 21332:1 21327:v 21293:) 21287:( 21282:) 21278:( 21264:. 21156:0 21153:= 21123:1 21120:= 21088:t 21077:t 21034:t 21023:t 21000:t 20947:E 20938:| 20917:H 20892:E 20883:| 20879:H 20852:H 20832:E 20812:H 20783:E 20774:| 20745:E 20736:| 20732:E 20729:= 20721:E 20712:| 20708:H 20680:E 20671:| 20643:H 20621:E 20578:E 20542:E 20516:E 20483:H 20457:E 20449:E 20446:= 20441:E 20433:H 20402:T 20390:. 20354:, 20351:3 20347:, 20344:2 20340:, 20337:1 20334:= 20331:n 20195:= 20192:x 20188:) 20184:k 20181:+ 20178:c 20172:+ 20169:m 20164:2 20155:( 20130:0 20127:= 20124:x 20121:k 20118:+ 20109:x 20103:c 20100:+ 20091:x 20085:m 20061:k 20011:2 19986:x 19983:m 19978:2 19970:= 19967:x 19964:k 19937:k 19913:m 19893:n 19870:x 19848:x 19845:k 19839:= 19830:x 19824:m 19804:0 19801:= 19798:x 19795:k 19792:+ 19783:x 19777:m 19670:k 19650:k 19630:k 19608:) 19603:i 19599:v 19595:( 19583:/ 19579:1 19559:i 19537:2 19533:/ 19529:1 19522:D 19499:i 19495:v 19472:i 19469:i 19465:D 19444:D 19418:2 19414:/ 19410:1 19403:D 19399:A 19394:2 19390:/ 19386:1 19379:D 19372:I 19348:A 19342:D 19314:A 19162:. 19138:) 19132:, 19126:( 19106:) 19103:3 19100:, 19097:1 19094:( 19042:i 19020:θ 19004:2 19000:) 18987:( 18984:4 18978:= 18975:D 18937:] 18931:1 18921:1 18915:[ 18910:= 18901:2 18896:u 18885:] 18879:1 18872:1 18866:[ 18861:= 18852:1 18847:u 18818:] 18812:0 18805:1 18799:[ 18794:= 18789:1 18784:u 18755:] 18749:i 18746:+ 18739:1 18733:[ 18728:= 18719:2 18714:u 18703:] 18697:i 18687:1 18681:[ 18676:= 18667:1 18662:u 18629:] 18623:1 18616:0 18610:[ 18605:= 18596:2 18591:u 18580:] 18574:0 18567:1 18561:[ 18556:= 18547:1 18542:u 18503:1 18500:= 18491:2 18479:1 18476:= 18467:1 18437:1 18434:= 18429:1 18399:1 18396:= 18387:2 18375:1 18372:= 18363:1 18329:1 18326:= 18317:2 18305:1 18302:= 18293:1 18263:2 18260:= 18255:1 18229:) 18224:i 18216:( 18210:= 18205:i 18191:, 18167:1 18164:= 18155:2 18143:1 18140:= 18131:1 18101:2 18098:= 18093:1 18063:1 18060:= 18051:2 18039:1 18036:= 18027:1 17993:1 17990:= 17981:2 17969:1 17966:= 17957:1 17927:2 17924:= 17919:1 17893:) 17888:i 17880:( 17874:= 17869:i 17855:, 17810:= 17791:e 17787:= 17778:2 17757:+ 17745:= 17729:e 17725:= 17716:1 17686:1 17683:= 17678:2 17670:= 17665:1 17626:i 17611:= 17596:i 17589:e 17585:= 17576:2 17555:i 17552:+ 17540:= 17525:i 17521:e 17517:= 17508:1 17472:2 17468:k 17464:= 17455:2 17441:1 17437:k 17433:= 17424:1 17394:k 17391:= 17386:2 17378:= 17373:1 17345:i 17316:1 17313:+ 17307:) 17301:( 17292:2 17284:2 17256:2 17252:) 17248:1 17239:( 17215:1 17212:+ 17206:) 17200:( 17191:2 17183:2 17157:) 17152:2 17148:k 17138:( 17135:) 17130:1 17126:k 17116:( 17093:2 17089:) 17085:k 17076:( 17043:] 16990:[ 16965:] 16959:1 16954:0 16947:k 16942:1 16936:[ 16911:] 16855:[ 16830:] 16822:2 16818:k 16812:0 16805:0 16798:1 16794:k 16787:[ 16762:] 16756:k 16751:0 16744:0 16739:k 16733:[ 16581:v 16549:v 16520:v 16509:v 16501:v 16497:A 16487:v 16479:= 16453:A 16432:v 16419:. 16406:C 16388:; 16374:1 16367:) 16363:I 16354:A 16351:( 16311:b 16288:T 16281:] 16275:b 16272:3 16264:b 16258:[ 16235:0 16232:= 16229:y 16226:+ 16223:x 16220:3 16200:1 16197:= 16174:A 16151:6 16148:= 16125:A 16105:a 16082:T 16075:] 16069:a 16066:2 16061:a 16055:[ 16032:x 16029:2 16026:= 16023:y 15994:0 15991:= 15984:y 15981:3 15975:x 15972:6 15965:0 15962:= 15955:y 15952:+ 15949:x 15946:2 15936:{ 15902:y 15899:6 15896:= 15889:y 15886:3 15883:+ 15880:x 15877:6 15870:x 15867:6 15864:= 15857:y 15854:+ 15851:x 15848:4 15841:{ 15813:] 15807:y 15800:x 15794:[ 15786:6 15783:= 15778:] 15772:y 15765:x 15759:[ 15752:] 15746:3 15741:6 15734:1 15729:4 15723:[ 15701:v 15698:6 15695:= 15692:v 15689:A 15665:] 15659:3 15654:6 15647:1 15642:4 15636:[ 15631:= 15628:A 15588:n 15564:n 15540:n 15513:! 15510:n 15490:n 15484:n 15444:2 15438:2 15418:A 15361:= 15358:x 15353:0 15349:a 15345:+ 15339:t 15336:d 15331:x 15328:d 15320:1 15316:a 15312:+ 15306:+ 15298:1 15292:k 15288:t 15284:d 15279:x 15274:1 15268:k 15264:d 15255:1 15249:k 15245:a 15241:+ 15233:k 15229:t 15225:d 15220:x 15215:k 15211:d 15177:. 15172:t 15167:k 15157:k 15153:c 15149:+ 15143:+ 15138:t 15133:1 15123:1 15119:c 15115:= 15110:t 15106:x 15082:, 15077:k 15068:, 15061:, 15056:1 15041:k 15025:] 15017:1 15014:+ 15011:k 15005:t 15001:x 14988:t 14984:x 14977:[ 14965:k 14951:, 14946:1 14943:+ 14940:k 14934:t 14930:x 14926:= 14921:1 14918:+ 14915:k 14909:t 14905:x 14898:, 14889:, 14884:1 14878:t 14874:x 14870:= 14865:1 14859:t 14855:x 14844:k 14827:, 14824:0 14821:= 14816:k 14812:a 14800:1 14794:k 14790:a 14775:2 14769:k 14759:2 14755:a 14746:1 14740:k 14730:1 14726:a 14717:k 14699:t 14695:x 14678:. 14673:k 14667:t 14663:x 14657:k 14653:a 14649:+ 14643:+ 14638:2 14632:t 14628:x 14622:2 14618:a 14614:+ 14609:1 14603:t 14599:x 14593:1 14589:a 14585:= 14580:t 14576:x 14487:T 14483:λ 14479:T 14465:λ 14457:T 14449:T 14437:T 14433:T 14429:λ 14411:T 14407:T 14403:T 14395:V 14391:V 14387:T 14383:T 14379:V 14375:T 14371:T 14363:T 14356:n 14352:T 14348:n 14336:T 14329:λ 14327:( 14324:T 14320:γ 14316:λ 14312:λ 14308:λ 14306:( 14303:T 14299:γ 14285:V 14281:λ 14277:E 14273:E 14269:E 14265:v 14262:α 14258:v 14254:u 14250:λ 14246:T 14242:v 14238:v 14234:u 14214:. 14211:) 14207:v 14200:( 14194:= 14187:) 14183:v 14176:( 14173:T 14166:, 14163:) 14159:v 14155:+ 14151:u 14147:( 14141:= 14134:) 14130:v 14126:+ 14122:u 14118:( 14115:T 14101:E 14097:v 14093:u 14089:λ 14085:T 14081:v 14077:u 14073:K 14069:α 14065:V 14061:y 14057:x 14037:, 14034:) 14030:x 14026:( 14023:T 14017:= 14010:) 14006:x 13999:( 13996:T 13989:, 13986:) 13982:y 13978:( 13975:T 13972:+ 13969:) 13965:x 13961:( 13958:T 13955:= 13948:) 13944:y 13940:+ 13936:x 13932:( 13929:T 13912:λ 13908:T 13896:E 13892:λ 13876:, 13872:} 13867:v 13860:= 13857:) 13853:v 13849:( 13846:T 13843:: 13839:v 13834:{ 13830:= 13827:E 13817:λ 13805:v 13801:λ 13797:v 13794:λ 13790:v 13786:T 13782:v 13780:( 13778:T 13774:v 13770:T 13762:λ 13758:T 13749:) 13747:5 13745:( 13728:. 13724:v 13717:= 13714:) 13710:v 13706:( 13703:T 13688:K 13684:λ 13680:T 13672:V 13668:v 13652:. 13649:V 13643:V 13640:: 13637:T 13627:V 13623:V 13619:T 13611:K 13604:V 13581:t 13579:( 13577:f 13573:λ 13559:, 13554:t 13547:e 13543:) 13540:0 13537:( 13534:f 13531:= 13528:) 13525:t 13522:( 13519:f 13502:t 13500:( 13498:f 13496:/ 13478:. 13475:) 13472:t 13469:( 13466:f 13460:= 13457:) 13454:t 13451:( 13448:f 13442:t 13439:d 13435:d 13409:t 13406:d 13402:d 13377:D 13361:) 13358:t 13355:( 13352:f 13346:= 13343:) 13340:t 13337:( 13334:f 13331:D 13318:D 13314:t 13306:C 13302:D 13282:T 13260:j 13240:j 13236:M 13215:, 13208:) 13203:k 13190:i 13182:( 13176:i 13170:k 13159:) 13156:) 13151:j 13147:M 13143:( 13138:k 13125:i 13117:( 13111:k 13100:= 13095:2 13090:| 13083:j 13080:, 13077:i 13073:v 13068:| 13053:j 13036:A 13032:γ 13015:T 13008:] 13002:1 12997:0 12992:0 12987:0 12981:[ 12955:T 12948:] 12942:1 12937:1 12929:1 12924:0 12918:[ 12898:A 12894:n 12889:A 12885:μ 12865:. 12860:2 12856:) 12846:3 12843:( 12838:2 12834:) 12824:2 12821:( 12818:= 12813:| 12801:3 12796:1 12791:0 12786:0 12779:0 12768:3 12763:1 12758:0 12751:0 12746:0 12735:2 12730:1 12723:0 12718:0 12713:0 12702:2 12696:| 12691:= 12688:) 12685:I 12676:A 12673:( 12650:, 12645:] 12639:3 12634:1 12629:0 12624:0 12617:0 12612:3 12607:1 12602:0 12595:0 12590:0 12585:2 12580:1 12573:0 12568:0 12563:0 12558:2 12552:[ 12547:= 12544:A 12514:, 12509:] 12503:1 12496:0 12489:0 12483:[ 12478:= 12471:3 12461:v 12455:, 12450:] 12444:3 12434:1 12427:0 12421:[ 12416:= 12409:2 12399:v 12393:, 12388:] 12380:2 12377:1 12368:1 12358:1 12352:[ 12347:= 12340:1 12330:v 12315:A 12309:3 12306:λ 12299:2 12296:λ 12289:1 12286:λ 12269:, 12266:) 12257:3 12254:( 12251:) 12242:2 12239:( 12236:) 12227:1 12224:( 12221:= 12218:) 12215:I 12206:A 12203:( 12190:A 12174:. 12169:] 12163:3 12158:3 12153:2 12146:0 12141:2 12136:1 12129:0 12124:0 12119:1 12113:[ 12108:= 12105:A 12061:, 12056:] 12050:1 12043:0 12036:0 12030:[ 12025:= 12018:3 12008:v 12002:, 11997:] 11991:0 11984:1 11977:0 11971:[ 11966:= 11959:2 11949:v 11943:, 11938:] 11932:0 11925:0 11918:1 11912:[ 11907:= 11900:1 11890:v 11875:A 11869:3 11866:λ 11859:2 11856:λ 11849:1 11846:λ 11829:, 11826:) 11817:3 11814:( 11811:) 11802:2 11799:( 11796:) 11787:1 11784:( 11781:= 11778:) 11775:I 11766:A 11763:( 11750:A 11734:. 11729:] 11723:3 11718:0 11713:0 11706:0 11701:2 11696:0 11689:0 11684:0 11679:1 11673:[ 11668:= 11665:A 11632:. 11620:3 11610:v 11605:= 11598:2 11588:v 11576:3 11573:λ 11569:2 11566:λ 11549:T 11542:] 11534:2 11522:3 11512:1 11506:[ 11500:= 11493:3 11483:v 11458:T 11451:] 11443:3 11431:2 11421:1 11415:[ 11409:= 11402:2 11392:v 11380:A 11364:. 11359:] 11351:2 11337:3 11325:1 11319:[ 11309:3 11301:= 11296:] 11290:1 11281:2 11267:3 11256:[ 11251:= 11246:] 11238:2 11224:3 11212:1 11206:[ 11201:A 11181:, 11176:] 11168:3 11154:2 11142:1 11136:[ 11126:2 11118:= 11113:] 11107:1 11098:3 11084:2 11073:[ 11068:= 11063:] 11055:3 11041:2 11029:1 11023:[ 11018:A 10996:. 10991:2 10983:= 10978:2 10973:3 10964:, 10959:3 10951:= 10946:2 10941:2 10932:, 10929:1 10926:= 10921:3 10911:2 10884:. 10879:] 10873:5 10866:5 10859:5 10853:[ 10845:1 10842:= 10837:] 10831:5 10824:5 10817:5 10811:[ 10806:= 10801:] 10795:5 10788:5 10781:5 10775:[ 10770:A 10760:1 10757:λ 10751:. 10739:1 10733:= 10728:2 10724:i 10698:i 10672:2 10668:3 10662:i 10654:2 10651:1 10643:= 10633:2 10625:= 10616:3 10602:2 10598:3 10592:i 10589:+ 10584:2 10581:1 10573:= 10564:2 10552:1 10549:= 10540:1 10521:λ 10505:. 10500:] 10494:0 10489:0 10484:1 10477:1 10472:0 10467:0 10460:0 10455:1 10450:0 10444:[ 10439:= 10436:A 10415:, 10400:T 10393:] 10387:2 10382:1 10377:0 10371:[ 10357:, 10342:T 10335:] 10329:1 10324:2 10316:0 10310:[ 10297:, 10282:T 10275:] 10269:0 10264:0 10259:1 10253:[ 10239:A 10216:+ 10202:2 10191:+ 10186:3 10175:= 10170:] 10159:) 10150:9 10147:( 10144:) 10135:3 10132:( 10127:[ 10122:) 10113:2 10110:( 10107:= 10097:, 10092:| 10080:9 10075:4 10070:0 10063:4 10052:3 10047:0 10040:0 10035:0 10024:2 10018:| 10013:= 10009:| 10003:] 9997:1 9992:0 9987:0 9980:0 9975:1 9970:0 9963:0 9958:0 9953:1 9947:[ 9934:] 9928:9 9923:4 9918:0 9911:4 9906:3 9901:0 9894:0 9889:0 9884:2 9878:[ 9872:| 9868:= 9861:) 9858:I 9849:A 9846:( 9829:A 9813:. 9808:] 9802:9 9797:4 9792:0 9785:4 9780:3 9775:0 9768:0 9763:0 9758:2 9752:[ 9747:= 9744:A 9724:λ 9717:λ 9712:A 9706:λ 9702:v 9696:λ 9692:v 9685:λ 9681:A 9663:] 9657:1 9650:1 9644:[ 9639:= 9634:] 9626:1 9622:v 9612:1 9608:v 9601:[ 9596:= 9591:3 9588:= 9580:v 9568:2 9565:v 9561:1 9558:v 9538:0 9535:= 9526:2 9522:v 9518:1 9510:1 9506:v 9502:1 9495:; 9492:0 9489:= 9480:2 9476:v 9472:1 9469:+ 9464:1 9460:v 9456:1 9444:] 9438:0 9431:0 9425:[ 9420:= 9415:] 9407:2 9403:v 9393:1 9389:v 9382:[ 9375:] 9369:1 9361:1 9354:1 9349:1 9340:[ 9335:= 9326:3 9323:= 9315:v 9310:) 9307:I 9304:3 9298:A 9295:( 9280:2 9273:λ 9265:λ 9261:A 9245:] 9239:1 9229:1 9223:[ 9218:= 9213:] 9205:1 9201:v 9188:1 9184:v 9177:[ 9172:= 9167:1 9164:= 9156:v 9144:2 9141:v 9137:1 9134:v 9118:0 9115:= 9110:2 9106:v 9102:1 9099:+ 9094:1 9090:v 9086:1 9065:] 9059:0 9052:0 9046:[ 9041:= 9036:] 9028:2 9024:v 9014:1 9010:v 9003:[ 8996:] 8990:1 8985:1 8978:1 8973:1 8967:[ 8962:= 8957:1 8954:= 8946:v 8941:) 8938:I 8932:A 8929:( 8918:2 8911:λ 8903:A 8897:λ 8890:λ 8869:. 8866:) 8863:1 8854:( 8851:) 8848:3 8839:( 8836:= 8824:2 8816:+ 8810:4 8804:3 8801:= 8789:| 8777:2 8772:1 8765:1 8754:2 8748:| 8743:= 8739:| 8733:] 8727:1 8722:0 8715:0 8710:1 8704:[ 8691:] 8685:2 8680:1 8673:1 8668:2 8662:[ 8656:| 8652:= 8645:) 8642:I 8633:A 8630:( 8613:A 8602:A 8598:λ 8593:1 8588:v 8572:. 8567:] 8561:2 8556:1 8549:1 8544:2 8538:[ 8533:= 8530:A 8518:. 8510:λ 8506:v 8500:λ 8496:v 8481:] 8473:2 8468:1 8461:1 8456:2 8448:[ 8437:A 8405:x 8383:x 8376:T 8370:x 8364:/ 8359:x 8355:H 8349:T 8343:x 8318:H 8282:A 8263:A 8259:A 8255:A 8251:n 8247:P 8243:P 8239:D 8235:A 8231:P 8217:P 8213:D 8206:P 8202:P 8198:A 8191:A 8187:Q 8173:A 8161:A 8145:. 8139:= 8136:Q 8133:A 8128:1 8121:Q 8107:Q 8090:, 8085:1 8078:Q 8071:Q 8068:= 8065:A 8052:Q 8048:Q 8031:. 8025:Q 8022:= 8019:Q 8016:A 8003:Q 7999:i 7976:. 7971:] 7963:n 7958:v 7951:n 7934:2 7929:v 7922:2 7910:1 7905:v 7898:1 7887:[ 7882:= 7879:Q 7876:A 7863:Q 7859:Q 7855:A 7851:A 7847:Q 7830:. 7825:] 7817:n 7812:v 7798:2 7793:v 7784:1 7779:v 7771:[ 7766:= 7763:Q 7750:A 7746:n 7742:Q 7734:n 7730:λ 7726:2 7723:λ 7719:1 7716:λ 7711:n 7707:v 7703:2 7700:v 7696:1 7693:v 7689:n 7685:A 7681:A 7653:A 7633:A 7610:T 7605:A 7581:T 7576:A 7555:A 7544:1 7527:. 7521:T 7515:u 7507:= 7501:T 7495:u 7487:T 7482:A 7441:A 7417:u 7397:n 7391:1 7371:u 7329:, 7325:u 7318:= 7315:A 7311:u 7290:A 7260:. 7256:v 7249:= 7245:v 7241:A 7230:1 7215:A 7195:n 7189:n 7153:. 7141:} 7138:) 7133:k 7125:( 7122:P 7119:, 7113:, 7110:) 7105:1 7097:( 7094:P 7091:{ 7071:) 7068:A 7065:( 7062:P 7042:P 7022:} 7016:+ 7011:k 7003:, 6997:, 6991:+ 6986:1 6978:{ 6958:A 6955:+ 6952:I 6928:C 6901:} 6898:1 6895:+ 6890:k 6882:, 6876:, 6873:1 6870:+ 6865:1 6857:{ 6837:I 6817:A 6814:+ 6811:I 6791:} 6786:k 6778:, 6772:, 6767:1 6759:{ 6739:n 6733:n 6713:A 6702:. 6690:1 6687:= 6683:| 6677:i 6668:| 6643:A 6616:A 6585:A 6559:A 6535:A 6504:n 6496:1 6491:, 6485:, 6478:1 6470:1 6446:1 6439:A 6418:A 6391:A 6380:. 6366:k 6361:n 6353:, 6347:, 6342:k 6337:1 6312:k 6290:k 6286:A 6265:A 6245:k 6221:. 6216:n 6203:2 6193:1 6185:= 6180:i 6170:n 6165:1 6162:= 6159:i 6151:= 6148:) 6145:A 6142:( 6117:A 6089:. 6084:n 6076:+ 6070:+ 6065:2 6057:+ 6052:1 6044:= 6039:i 6029:n 6024:1 6021:= 6018:i 6010:= 6005:i 6002:i 5998:a 5992:n 5987:1 5984:= 5981:i 5973:= 5970:) 5967:A 5964:( 5936:A 5908:) 5903:i 5895:( 5890:A 5865:) 5860:i 5852:( 5847:A 5820:n 5812:, 5806:, 5801:1 5776:n 5770:n 5750:A 5733:. 5721:A 5699:n 5694:C 5666:A 5646:n 5624:n 5619:C 5606:. 5592:n 5587:C 5565:A 5541:n 5538:= 5533:A 5508:A 5488:A 5460:, 5457:n 5449:A 5434:d 5427:, 5424:) 5419:i 5411:( 5406:A 5396:d 5391:1 5388:= 5385:i 5377:= 5368:A 5339:A 5319:) 5314:i 5306:( 5301:A 5274:i 5247:d 5239:, 5233:, 5228:1 5203:n 5197:d 5177:A 5154:) 5148:( 5143:A 5132:) 5126:( 5121:A 5074:) 5068:( 5063:A 5054:) 5041:( 5021:) 5018:I 5009:D 5006:( 4983:D 4963:) 4960:I 4951:D 4948:( 4942:= 4939:) 4936:I 4927:A 4924:( 4901:I 4892:D 4872:I 4863:A 4843:V 4823:I 4803:) 4800:I 4791:D 4788:( 4785:V 4782:= 4779:V 4776:) 4773:I 4764:A 4761:( 4741:V 4713:) 4707:( 4702:A 4693:I 4669:V 4666:A 4661:T 4657:V 4650:D 4630:V 4610:A 4590:) 4584:( 4579:A 4568:n 4548:) 4542:( 4537:A 4512:V 4490:k 4485:v 4477:= 4472:k 4467:v 4462:A 4440:) 4434:( 4429:A 4419:v 4413:, 4406:, 4401:1 4396:v 4371:) 4365:( 4360:A 4335:) 4329:( 4324:A 4313:) 4307:( 4302:A 4275:n 4269:) 4263:( 4258:A 4247:) 4241:( 4236:A 4225:1 4215:n 4198:. 4195:) 4192:I 4183:A 4180:( 4168:n 4165:= 4162:) 4156:( 4151:A 4132:A 4124:A 4112:A 4108:λ 4100:A 4096:E 4082:) 4076:( 4071:A 4053:λ 4049:λ 4045:E 4038:λ 4034:A 4030:v 4027:α 4023:v 4019:u 4011:) 4009:v 4006:α 4004:( 4002:λ 3998:v 3995:α 3993:( 3991:A 3985:E 3981:v 3978:α 3976:( 3972:α 3967:E 3963:v 3958:E 3950:) 3948:v 3944:u 3942:( 3940:λ 3936:v 3932:u 3930:( 3928:A 3922:E 3918:v 3914:u 3912:( 3907:E 3903:v 3899:u 3894:E 3890:v 3886:u 3878:E 3859:n 3854:C 3842:E 3834:n 3830:λ 3826:λ 3822:A 3810:E 3802:A 3798:E 3794:λ 3790:A 3782:E 3778:λ 3774:A 3766:A 3746:. 3742:} 3737:0 3733:= 3729:v 3724:) 3720:I 3711:A 3707:( 3703:: 3699:v 3694:{ 3690:= 3687:E 3676:2 3671:v 3667:E 3660:A 3656:n 3652:n 3648:λ 3631:i 3627:λ 3622:i 3618:λ 3616:( 3613:A 3609:γ 3604:i 3600:λ 3595:i 3591:λ 3589:( 3586:A 3582:μ 3573:i 3569:λ 3564:i 3560:λ 3558:( 3555:A 3551:μ 3531:. 3528:n 3525:= 3521:) 3516:i 3508:( 3502:A 3492:d 3487:1 3484:= 3481:i 3473:= 3464:A 3452:, 3449:n 3443:) 3438:i 3430:( 3425:A 3410:1 3396:n 3391:4 3386:n 3382:n 3378:d 3362:. 3357:) 3352:d 3344:( 3339:A 3330:) 3318:d 3310:( 3302:) 3297:2 3289:( 3284:A 3275:) 3263:2 3255:( 3250:) 3245:1 3237:( 3232:A 3223:) 3211:1 3203:( 3200:= 3197:) 3194:I 3185:A 3182:( 3169:d 3165:n 3161:A 3156:4 3151:n 3147:d 3143:n 3139:A 3127:i 3123:λ 3119:λ 3115:k 3106:i 3102:λ 3100:( 3097:A 3093:μ 3086:A 3082:n 3078:n 3073:i 3069:λ 3016:A 3008:A 2999:A 2983:. 2978:] 2972:1 2965:1 2959:[ 2954:= 2949:3 2946:= 2938:v 2932:, 2927:] 2921:1 2911:1 2905:[ 2900:= 2895:1 2892:= 2884:v 2872:. 2859:0 2855:= 2851:v 2846:) 2842:I 2833:A 2829:( 2817:v 2813:A 2789:. 2784:2 2776:+ 2770:4 2764:3 2761:= 2756:| 2744:2 2739:1 2732:1 2721:2 2715:| 2710:= 2707:) 2704:I 2695:A 2692:( 2679:A 2675:) 2669:A 2667:( 2651:. 2646:] 2640:2 2635:1 2628:1 2623:2 2617:[ 2612:= 2609:A 2596:A 2591:n 2587:λ 2583:2 2580:λ 2576:1 2573:λ 2568:i 2564:λ 2555:) 2553:4 2551:( 2534:, 2531:) 2520:n 2512:( 2506:) 2495:2 2487:( 2484:) 2473:1 2465:( 2462:= 2459:) 2456:I 2447:A 2444:( 2426:n 2418:n 2414:A 2410:n 2406:n 2395:A 2382:3 2377:A 2367:λ 2363:n 2359:A 2351:A 2347:n 2339:λ 2330:3 2316:) 2314:3 2312:( 2295:0 2292:= 2289:) 2286:I 2277:A 2274:( 2256:λ 2252:A 2248:) 2242:A 2240:( 2229:v 2224:2 2205:0 2198:n 2194:n 2190:I 2181:) 2179:2 2177:( 2160:, 2156:0 2152:= 2148:v 2143:) 2139:I 2130:A 2126:( 2109:1 2101:A 2092:1 2083:λ 2079:A 2070:v 2060:) 2058:1 2056:( 2039:, 2035:v 2028:= 2024:w 2020:= 2016:v 2012:A 1997:w 1993:v 1977:. 1972:j 1968:v 1962:j 1959:i 1955:A 1949:n 1944:1 1941:= 1938:j 1930:= 1925:n 1921:v 1915:n 1912:i 1908:A 1904:+ 1898:+ 1893:2 1889:v 1883:2 1880:i 1876:A 1872:+ 1867:1 1863:v 1857:1 1854:i 1850:A 1846:= 1841:i 1837:w 1814:] 1806:n 1802:w 1785:2 1781:w 1771:1 1767:w 1760:[ 1755:= 1750:] 1742:n 1738:v 1721:2 1717:v 1707:1 1703:v 1696:[ 1689:] 1681:n 1678:n 1674:A 1661:2 1658:n 1654:A 1646:1 1643:n 1639:A 1607:n 1604:2 1600:A 1583:A 1571:A 1561:n 1558:1 1554:A 1537:A 1525:A 1518:[ 1496:, 1492:w 1488:= 1484:v 1480:A 1470:A 1466:n 1462:n 1458:n 1436:1 1428:= 1403:. 1399:y 1392:= 1388:x 1377:λ 1349:. 1344:] 1312:[ 1307:= 1303:y 1288:] 1282:4 1275:3 1265:1 1259:[ 1254:= 1250:x 1239:n 1235:n 1229:. 1227:A 1223:x 1219:x 1215:A 967:. 961:T 953:T 946:T 934:T 904:n 900:v 886:, 882:v 875:= 871:v 867:A 857:A 853:n 849:n 845:n 841:n 837:n 823:. 818:x 811:e 804:= 799:x 792:e 785:x 782:d 778:d 748:x 745:d 741:d 679:λ 671:λ 649:, 645:v 638:= 635:) 631:v 627:( 624:T 614:λ 610:T 606:T 602:T 598:v 551:( 508:n 500:n 496:n 478:v 471:= 467:v 463:A 453:λ 449:A 434:v 419:λ 415:λ 400:v 378:v 374:A 353:v 342:A 328:. 325:n 304:v 293:A 279:n 271:n 168:v 161:= 157:v 153:T 109:T 88:v 49:ɡ 43:ˈ 40:/ 36:( 23:.

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Index