Asymptotic values of four Laplacian-type energies for matrices with degree-distance-based entries of random graphs

Abstract

Let f(D(i, j), di, dj) be a real function symmetric in i and j with the property that f(d, (1+o(1))np, (1+o(1))np)=(1+o(1))f(d, np, np) for d=1,2. Let G be a graph, di denote the degree of a vertex i of G and D(i, j) denote the distance between vertices i and j in G. In this paper, we define the f-weighted Laplacian matrix for random graphs in the Erdos-Renyi random graph model Gn, p, where p∈ (0, 1) is fixed. Four weighted Laplacian type energies: the weighted Laplacian energy LEf(G), weighted signless Laplacian energy LE+f(G), weighted incidence energy IEf(G) and the weighted Laplacian-energy like invariant LELf(G) are introduced and studied. We obtain the asymptotic values of IEf(G) and LELf(G), and the values of LEf(G) and LEf+(G) under the condition that f(D(i, j), di, dj) is a function dependent only on D(i, j). As a consequence, we get that for almost all graphs Gp∈ Gn, p, the energy for the matrix with degree-distance-based entries of Gp, E(Wf(Gp)) < LEf(Gp), the Laplacian energy of the matrix, which is a generalization of a conjecture by Gutman et al.