On graphs with maximum Harary spectral radius

Abstract

Let G be a simple graph with vertex set V(G) = \v1 ,v2 ,·s ,vn\. The Harary matrix RD(G) of G, which is initially called the reciprocal distance matrix, is an n × n matrix whose (i,j)-entry is equal to 1dij if i=j and 0 otherwise, where dij is the distance of vi and vj in G. In this paper, we characterize graphs with maximum spectral radius of Harary matrix in three classes of simple connected graphs with n vertices: graphs with fixed matching number, bipartite graphs with fixed matching number, and graphs with given number of cut edges, respectively.