Fixed points of automorphisms of certain non-cyclic p-groups and the dihedral group

Abstract

Let G=Zp Zp2, where p is a prime number. Suppose that d is a divisor of the order of G. In this paper we find the number of automorphisms of G fixing d elements of G, and denote it by θ(G,d). As a consequence, we prove a conjecture of Checco-Darling-Longfield-Wisdom. We also find the exact number of fixed-point-free automorphisms of the group Zpa Zpb, where a and b are positive integers with a<b. Finally, we compute θ(D2q,d), where D2q is the dihedral group of order 2q, q is an odd prime and d ∈ \1,q,2q\.