Self-complementary graph

In the mathematical field of graph theory, a self-complementary graph is a graph which is isomorphic to its complement. The simplest non-trivial self-complementary graphs are the 4-vertex path graph and the 5-vertex cycle graph. There is no known characterization of self-complementary graphs.

Examples edit

Every Paley graph is self-complementary.^[1] For example, the 3 × 3 rook's graph (the Paley graph of order nine) is self-complementary, by a symmetry that keeps the center vertex in place but exchanges the roles of the four side midpoints and four corners of the grid.^[2] All strongly regular self-complementary graphs with fewer than 37 vertices are Paley graphs; however, there are strongly regular graphs on 37, 41, and 49 vertices that are not Paley graphs.^[3]

The Rado graph is an infinite self-complementary graph.^[4]

Properties edit

An $n$ -vertex self-complementary graph has exactly half as many edges of the complete graph, i.e., $n (n - 1)/4$ edges, and (if there is more than one vertex) it must have diameter either 2 or 3.^[1] Since $n (n - 1)$ must be divisible by 4, $n$ must be congruent to 0 or 1 modulo 4; for instance, a 6-vertex graph cannot be self-complementary.

Computational complexity edit

The problems of checking whether two self-complementary graphs are isomorphic and of checking whether a given graph is self-complementary are polynomial-time equivalent to the general graph isomorphism problem.^[5]

References edit

^ ^a ^b Sachs, Horst (1962), "Über selbstkomplementäre Graphen", Publicationes Mathematicae Debrecen, 9: 270–288, MR 0151953.
^ Shpectorov, S. (1998), "Complementary l₁-graphs", Discrete Mathematics, 192 (1–3): 323–331, doi:10.1016/S0012-365X(98)0007X-1, MR 1656740.
^ Rosenberg, I. G. (1982), "Regular and strongly regular selfcomplementary graphs", Theory and practice of combinatorics, North-Holland Math. Stud., vol. 60, Amsterdam: North-Holland, pp. 223–238, MR 0806985.
^ Cameron, Peter J. (1997), "The random graph", The mathematics of Paul Erdős, II, Algorithms Combin., vol. 14, Berlin: Springer, pp. 333–351, arXiv:1301.7544, Bibcode:2013arXiv1301.7544C, MR 1425227. See in particular Proposition 5.
^ Colbourn, Marlene J.; Colbourn, Charles J. (1978), "Graph isomorphism and self-complementary graphs", SIGACT News, 10 (1): 25–29, doi:10.1145/1008605.1008608.

External links edit

Weisstein, Eric W., "Self-Complementary Graph", MathWorld

[sachs-1] Sachs, Horst (1962), "Über selbstkomplementäre Graphen", Publicationes Mathematicae Debrecen, 9: 270–288, MR 0151953.

[2] Shpectorov, S. (1998), "Complementary l₁-graphs", Discrete Mathematics, 192 (1–3): 323–331, doi:10.1016/S0012-365X(98)0007X-1, MR 1656740.

[3] Rosenberg, I. G. (1982), "Regular and strongly regular selfcomplementary graphs", Theory and practice of combinatorics, North-Holland Math. Stud., vol. 60, Amsterdam: North-Holland, pp. 223–238, MR 0806985.

[4] Cameron, Peter J. (1997), "The random graph", The mathematics of Paul Erdős, II, Algorithms Combin., vol. 14, Berlin: Springer, pp. 333–351, arXiv:1301.7544, Bibcode:2013arXiv1301.7544C, MR 1425227. See in particular Proposition 5.

[5] Colbourn, Marlene J.; Colbourn, Charles J. (1978), "Graph isomorphism and self-complementary graphs", SIGACT News, 10 (1): 25–29, doi:10.1145/1008605.1008608.

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