Enumeration of skew morphisms of cyclic 2-groups

Abstract

A skew morphism of a finite group B is a permutation of B fixing the identity and satisfying (xy) = (x)ix(y) for some integers ix indexed by x ∈ B. The enumeration of skew morphisms of finite cyclic groups remains an open problem. The most substantial progress to date concerns cyclic p-groups with p odd, for which a full classification and enumeration was obtained by Kov\'acs and Nedela. In this paper we treat the remaining case p = 2, giving a complete classification and enumeration of skew morphisms of finite cyclic 2-groups. Writing Skew(n) for the number of skew morphisms of Zn, we prove that Skew(2e) = 4\,Skew(2e-1) - 4 for each e ≥ 4, and that Skew(2e) = (7 · 4e-2 + 8)/6 for each e ≥ 3. This completes the enumeration of skew morphisms for all cyclic p-groups.