On the minimum degree of power graphs of finite nilpotent groups

Abstract

The power graph P(G) of a group G is the simple graph with vertex set G and two vertices are adjacent whenever one of them is a positive power of the other. In this paper, for a finite noncyclic nilpotent group G, we study the minimum degree δ(P(G)) of P(G). Under some conditions involving the prime divisors of |G| and the Sylow subgroups of G, we identify certain vertices associated with the generators of maximal cyclic subgroups of G such that δ(P(G)) is equal to the degree of one of these vertices. As an application, we obtain δ(P(G)) for some classes of finite noncyclic abelian groups G.