Some Properties of Proper Power Graphs in Finite Abelian Groups

Abstract

The power graph of a group G, denoted as P(G), constitutes a simple undirected graph characterized by its vertex set G. Specifically, vertices a,b exhibit adjacency exclusively if a belongs to the cyclic subgroup generated by b or vice versa. The corresponding proper power graph of G is obtained by taking P(G) and removing a vertex corresponding to the identity element, which is denoted as P*(G). In the context of finite abelian groups, this article establishes the sufficient and necessary conditions for the proper power graph's connectedness. Moreover, a precise upper bound for the diameter of P*(G) in finite abelian groups is provided with sharpness. This article also explores the study of vertex connectivity, center, and planarity.