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Typically, no clear distinction is made between such a graph in the more abstract sense of graph theory, and its drawing in space (often the plane or 3D space). This type of graph may more shortly be called just a
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graph for a finite set of points in the plane is produced by the grid obtained by intersections of all vertical and horizontal lines through each point of the set.
148:. Moreover, these terms are also commonly used for a finite section of the infinite graph, as in "an 8 × 8 square grid".
201:, and two vertices are connected by an edge whenever the corresponding points are at distance 1. In other words, it is a
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398:, although this graph is strictly different than the lattice graph described in this article. The valid moves of
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has also been given in the literature to various other kinds of graphs with some regular structure, such as the
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233:, the latter fact implies that the square grid graph is also a median graph. All square grid graphs are
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237:, which is easily verified by the fact that one can color the vertices in a checkerboard fashion.
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Grid graphs are fundamental objects in the theory of graph minors because of the
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A common type of lattice graph (known under different names, such as
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A path graph may also be considered to be a grid graph on the grid
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Graph whose embedding in a
Euclidean space forms a regular tiling
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Robertson, N.; Seymour, P.; Thomas, R. (November 1994).
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383:(the graph that represents all legal moves of the
369:is a graph that corresponds to a triangular grid.
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229: − 1 edges. Since a path graph is a
244:times 1. A 2 × 2 grid graph is a
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510:Journal of Combinatorial Theory, Series B
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130:lattice in the group-theoretical sense
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128:that send the graph to itself is a
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506:"Quickly Excluding a Planar Graph"
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425:Integer triangles in a 2D lattice
339:{\displaystyle h=2|V(H)|+4|E(H)|}
107:{\displaystyle \mathbb {R} ^{n}}
405:form the square lattice graph.
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215:Cartesian product of graphs
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213:A square grid graph is a
126:bijective transformations
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355:bidimensionality theory
523:10.1006/jctb.1994.1073
351:grid exclusion theorem
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367:triangular grid graph
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225: − 1 and
196:1, ...,
185:1, ...,
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203:unit distance graph
194:being in the range
183:being in the range
481:Weisstein, Eric W.
451:Weisstein, Eric W.
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104:
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400:fairy chess piece
217:, namely, of two
173:square grid graph
167:Square grid graph
157:Cartesian product
16:(Redirected from
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454:"Lattice graph"
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161:complete graphs
159:of a number of
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516:(2): 323–348.
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430:Regular graph
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484:"Grid graph"
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415:Lattice path
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381:rook's graph
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270:grid, where
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253:planar graph
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231:median graph
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54:graph theory
51:
388:chess piece
361:Other kinds
219:path graphs
35:Square grid
538:Categories
436:References
392:chessboard
374:Hanan grid
209:Properties
116:, forms a
66:grid graph
62:mesh graph
18:Grid graph
489:MathWorld
459:MathWorld
235:bipartite
151:The term
409:See also
80:in some
78:embedded
262:of the
246:4-cycle
177:integer
138:lattice
114:
85:
74:drawing
251:Every
72:whose
403:wazir
390:on a
260:minor
258:is a
221:with
144:, or
122:group
70:graph
68:is a
64:, or
48:graph
37:graph
385:rook
379:The
146:grid
142:mesh
56:, a
518:doi
124:of
52:In
540::
514:62
512:.
508:.
486:.
469:^
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372:A
365:A
357:.
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190:,
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140:,
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76:,
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520::
492:.
462:.
333:|
329:)
326:H
323:(
320:E
316:|
312:4
309:+
305:|
301:)
298:H
295:(
292:V
288:|
284:2
281:=
278:h
268:h
264:h
256:H
242:n
227:m
223:n
198:m
187:n
100:n
95:R
20:)
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