Graph automorphism

In the mathematical field of graph theory, an automorphism of a graph is a form of symmetry in which the graph is mapped onto itself while preserving the edge–vertex connectivity.

Formally, an automorphism of a graph $G = (V, E)$ is a permutation $σ$ of the vertex set $V$ , such that the pair of vertices $(u, v)$ form an edge if and only if the pair $(σ (u), σ (v))$ also form an edge. That is, it is a graph isomorphism from $G$ to itself. Automorphisms may be defined in this way both for directed graphs and for undirected graphs. The composition of two automorphisms is another automorphism, and the set of automorphisms of a given graph, under the composition operation, forms a group, the automorphism group of the graph. In the opposite direction, by Frucht's theorem, all groups can be represented as the automorphism group of a connected graph – indeed, of a cubic graph.^[1]^[2]

^ Frucht, R. (1938), "Herstellung von Graphen mit vorgegebener abstrakter Gruppe", Compositio Mathematica (in German), 6: 239–250, ISSN 0010-437X, Zbl 0020.07804.
^ Frucht, R. (1949), "Graphs of degree three with a given abstract group" (PDF), Canadian Journal of Mathematics, 1 (4): 365–378, doi:10.4153/CJM-1949-033-6, ISSN 0008-414X, MR 0032987, S2CID 124723321, archived from the original on Jun 9, 2012.

[1] Frucht, R. (1938), "Herstellung von Graphen mit vorgegebener abstrakter Gruppe", Compositio Mathematica (in German), 6: 239–250, ISSN 0010-437X, Zbl 0020.07804.

[2] Frucht, R. (1949), "Graphs of degree three with a given abstract group" (PDF), Canadian Journal of Mathematics, 1 (4): 365–378, doi:10.4153/CJM-1949-033-6, ISSN 0008-414X, MR 0032987, S2CID 124723321, archived from the original on Jun 9, 2012.

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