On the minimum degree of the power graph of a finite cyclic group

Abstract

The power graph P(G) of a finite group G is the simple undirected graph whose vertex set is G, in which two distinct vertices are adjacent if one of them is an integral power of the other. For an integer n≥ 2, let Cn denote the cyclic group of order n and let r be the number of distinct prime divisors of n. The minimum degree δ(P(Cn)) of P(Cn) is known for r∈\1,2\, see [18]. For r≥ 3, under certain conditions involving the prime divisors of n, we identify at most r-1 vertices such that δ(P(Cn)) is equal to the degree of at least one of these vertices. If r=3 or if n is a product of distinct primes, we are able to identify two such vertices without any condition on the prime divisors of n.