Circulant graph


In graph theory, a circulant graph is an undirected graph acted on by a cyclic group of symmetries which takes any vertex to any other vertex. It is sometimes called a cyclic graph, but this term has other meanings.

Equivalent definitions

Circulant graphs can be described in several equivalent ways:
Every cycle graph is a circulant graph, as is every crown graph with vertices.
The Paley graphs of order is a graph in which the vertices are the numbers from 0 to and two vertices are adjacent if their difference is a quadratic residue modulo . Since the presence or absence of an edge depends only on the difference modulo of two vertex numbers, any Paley graph is a circulant graph.
Every Möbius ladder is a circulant graph, as is every complete graph. A complete bipartite graph is a circulant graph if it has the same number of vertices on both sides of its bipartition.
If two numbers and are relatively prime, then the rook's graph is a circulant graph. This is because its symmetries include as a subgroup the cyclic group Cmn Cm×Cn. More generally, in this case, the tensor product of graphs between any - and -vertex circulants is itself a circulant.
Many of the known lower bounds on Ramsey numbers come from examples of circulant graphs that have small maximum cliques and small maximum independent sets.

A specific example

The circulant graph with jumps is defined as the graph with nodes labeled where each node i is adjacent to 2k nodes.
A self-complementary graph is a graph in which replacing every edge by a non-edge and vice versa produces an isomorphic graph.
For instance, a five-vertex cycle graph is self-complementary, and is also a circulant graph. More generally every Paley graph of prime order is a self-complementary circulant graph. Horst Sachs showed that, if a number has the property that every prime factor of is congruent to, then there exists a self-complementary circulant with vertices. He conjectured that this condition is also necessary: that no other values of allow a self-complementary circulant to exist. The conjecture was proven some 40 years later, by Vilfred.

Ádám's conjecture

Define a circulant numbering of a circulant graph to be a labeling of the vertices of the graph by the numbers from 0 to in such a way that, if some two vertices numbered and are adjacent, then every two vertices numbered and are adjacent. Equivalently, a circulant numbering is a numbering of the vertices for which the adjacency matrix of the graph is a circulant matrix.
Let be an integer that is relatively prime to, and let be any integer. Then the linear function that takes a number to transforms a circulant numbering to another circulant numbering. András Ádám conjectured that these linear maps are the only ways of renumbering a circulant graph while preserving the circulant property: that is, if and are isomorphic circulant graphs, with different numberings, then there is a linear map that transforms the numbering for into the numbering for. However, Ádám's conjecture is now known to be false. A counterexample is given by graphs and with 16 vertices each; a vertex in is connected to the six neighbors,, and modulo 16, while in the six neighbors are,, and modulo 16. These two graphs are isomorphic, but their isomorphism cannot be realized by a linear map.
Toida's conjecture refines Ádám's conjecture by considering only a special class of circulant graphs, in which all of the differences between adjacent graph vertices are relatively prime to the number of vertices. According to this refined conjecture, these special circulant graphs should have the property that all of their symmetries come from symmetries of the underlying additive group of numbers modulo. It was proven by two groups in 2001 and 2002.

Algorithmic questions

There is a polynomial-time recognition algorithm for circulant graphs, and the isomorphism problem for circulant graphs can be solved in polynomial time.