Asymptotic Laplacian-Energy-Like Invariant of Lattices

Abstract

Let μ1 μ2·sμn denote the Laplacian eigenvalues of G with n vertices. The Laplacian-energy-like invariant, denoted by LEL(G)= Σi=1n-1μi, is a novel topological index. In this paper, we show that the Laplacian-energy-like per vertex of various lattices is independent of the toroidal, cylindrical, and free boundary conditions. Simultaneously, the explicit asymptotic values of the Laplacian-energy-like in these lattices are obtained. Moreover, our approach implies that in general the Laplacian-energy-like per vertex of other lattices is independent of the boundary conditions.