Algebraic degree of Cayley colour graphs

Abstract

The splitting field of a graph with respect to a square matrix M associated with , is the smallest field extension over the field of rationals Q that contains all the eigenvalues of M. The degree of the extension is called the algebraic degree of with respect to M. In this paper, we completely determine the splitting field of the adjacency matrix of the Cayley colour graph Cay(G,f) on a finite group G, associated with a class function f:G and compute its algebraic degree, which generalize the main results of Wu et al. Moreover, we study the relation between the algebraic integrality of two Cayley colour graphs, and deduce the fact that the algebraic degree and distance algebraic degree of a normal Cayley graph are same, generalizing a result of Zhang et al.