On the distribution of eigenvalues of the reciprocal distance Laplacian matrix of graphs
On the distribution of eigenvalues of the reciprocal distance Laplacian matrix of graphs
The reciprocal distance Laplacian matrix of a connected graph G is defined as RDL(G) = RT(G) ? RD(G), where RT(G) is the diagonal matrix of reciprocal distance degrees and RD(G) is the Harary matrix. Since RDL(G) is a real symmetric matrix, we denote its eigenvalues as ?1(RDL(G)) ? ?2(RDL(G)) ?...? …