The generalized reciprocal distance matrix of graphs

Abstract

Let G be a simple undirected connected graph with the Harary matrix RD(G), which is also called the reciprocal distance matrix of G. The reciprocal distance signless Laplacian matrix of G is RQ(G)=RT(G)+RD(G), where RT(G) denotes the diagonal matrix of the vertex reciprocal transmissions of graph G. This paper intends to introduce a new matrix RDα(G)=α RT(G)+(1-α)RD(G), α∈ [0,1], to track the gradual change from RD(G) to RQ(G). First, we describe completely the eigenvalues of RDα(G) of some special graphs. Then we obtain serval basic properties of RDα(G) including inequalities that involve the spectral radii of the reciprocal distance matrix, reciprocal distance signless Laplacian matrix and RDα-matrix of G. We also provide some lower and upper bounds of the spectral radius of RDα-matrix. Finally, we depict the extremal graphs with maximal spectral radius of the RDα-matrix among all connected graphs of fixed order and precise vertex connectivity, edge connectivity, chromatic number and independence number, respectively.