Spectra of subdivision-vertex join and subdivision-edge join of two graphs

Abstract

The subdivision graph S(G) of a graph G is the graph obtained by inserting a new vertex into every edge of G. Let G1 and G2 be two vertex disjoint graphs. The subdivision-vertex join of G1 and G2, denoted by G1G2, is the graph obtained from S(G1) and G2 by joining every vertex of V(G1) with every vertex of V(G2). The subdivision-edge join of G1 and G2, denoted by G1G2, is the graph obtained from S(G1) and G2 by joining every vertex of I(G1) with every vertex of V(G2), where I(G1) is the set of inserted vertices of S(G1). In this paper we determine the adjacency spectra, the Laplacian spectra and the signless Laplacian spectra of G1G2 (respectively, G1G2) for a regular graph G1 and an arbitrary graph G2, in terms of the corresponding spectra of G1 and G2. As applications, these results enable us to construct infinitely many pairs of cospectral graphs. We also give the number of the spanning trees and the Kirchhoff index of G1G2 (respectively, G1G2) for a regular graph G1 and an arbitrary graph G2.