Hopf-Galois Realizability of Zn2

Abstract

Let G and N be finite groups of order 2n where n is odd. We say the pair (G,N) is Hopf-Galois realizable if G is a regular subgroup of (N)=N(N). In this article we give necessary conditions on G (similarly N) when N (similarly G) is a group of the form Zn2. Further we show that this condition is also sufficient if radical of n is a Burnside number. This classifies all the skew braces which has the additive group (or the multiplicative group) to be isomorphic to Zn2, in this case.