Vertex weighted Laplacian graph energy and other topological indices

Abstract

Let G be a graph with a vertex weight ω and the vertices v1,…,vn. The Laplacian matrix of G with respect to ω is defined as Lω(G)=diag(ω(v1),·s,ω(vn))-A(G), where A(G) is the adjacency matrix of G. Let μ1,·s,μn be eigenvalues of Lω(G). Then the Laplacian energy of G with respect to ω defined as LEω (G)=Σi=1n|μi - ω|, where ω is the average of ω, i.e., ω=Σi=1nω(vi)n. In this paper we consider several natural vertex weights of G and obtain some inequalities between the ordinary and Laplacian energies of G with corresponding vertex weights. Finally, we apply our results to the molecular graph of toroidal fullerenes (or achiral polyhex nanotorus).