Cayley graphs on p-solvable groups generated by p-singular elements

Abstract

For a graph , the multiplicity of the eigenvalue 0, denoted by η(), is called the nullity of . Also the energy of , denoted by E(), is defined as the sum of the absolute values of the eigenvalues of . The index of a subgroup H in a group G is denoted by [G:H]. For a prime p, let G be a finite p-solvable group whose order is divisible by p. Also let p(G) be the set of all p-singular elements of G. In this paper, we apply block theory of finite groups to show that the Cayley graph p(G):=Cay(G,p(G)) is an integral graph with η(p(G))=|G|-[G:Op(G)], where Op(G) is the largest normal subgroup of G whose order is co-prime to p. We also find a lower bound for E(p(G)). Finally, we prove that the diameter of p(G) is at most |G|p.