Groups all of whose undirected Cayley graphs are determined by their spectra

Abstract

Let G be a finite group, and S be a subset of G\1\ such that S=S-1. Suppose that Cay(G,S) is the Cayley graph on G with respect to the set S which is the graph whose vertex set is G and two vertices a,b∈ G are adjacent if and only if ab-1∈ S. The adjacency spectrum Spec() of a graph is the multiset of eigenvalues of its adjacency matrix. A graph is called "determined by its spectrum" (or for short DS) whenever if a graph ' has the same spectrum as , then '. We say that the group G is DS (Cay-DS, respectively) whenever if is a Cayley graph over G and Spec()=Spec(') for some graph (Cayley graph, respectively) ', then '. In this paper, we study finite DS groups and finite Cay-DS groups. In particular we prove that all finite DS groups are solvable and all Sylow p-subgroups of a finite DS group is cyclic for all p≥ 5. We also give several infinite families of non Cay-DS solvable groups. In particular we prove that there exist two cospectral non-isomorphic 6-regular Cayley graphs on the dihedral group of order 2p for any prime p≥ 13.