Graphs with small diameter determined by their D-spectra

Abstract

Let G be a connected graph with vertex set V(G)=\v1,v2,...,vn\. The distance matrix D(G)=(dij)n× n is the matrix indexed by the vertices of G, where dij denotes the distance between the vertices vi and vj. Suppose that λ1(D)≥λ2(D)≥·s≥λn(D) are the distance spectrum of G. The graph G is said to be determined by its D-spectrum if with respect to the distance matrix D(G), any graph having the same spectrum as G is isomorphic to G. In this paper, we give the distance characteristic polynomial of some graphs with small diameter, and also prove that these graphs are determined by their D-spectra.