The Laplacian spectrum of power graphs of some finite abelian p-groups

Abstract

The power graph G(G) of a group G is a simple graph whose vertices are the elements of G and two distinct vertices are adjacent if one is a power of other. In this paper, we investigate the Laplacian spectrum of the power graph G(Zpmn) of finite abelian p-group Zpmn. In particular, we prove that the spectrum of group Zpmn is contained in the Laplacian spectrum of graph G(Zpmn). For a finite abelian group G whose power graph G(G) is planar, we also prove that the spectrum of group G is contained in the Laplacian spectrum of graph G(G).