Hopf-Galois structures on cyclic extensions and skew braces with cyclic multiplicative group
Abstract
Let G and N be two finite groups of the same order. It is well-known that the existences of the following are equivalent: (a) a Hopf-Galois structure of type N on any Galois G-extension; (b) a skew brace with additive group N and multiplicative group G; (c) a regular subgroup isomorphic to G in the holomorph of N. We shall say that (G,N) is realizable when any of the above exists. Fixing N to be a cyclic group, W. Rump (2019) has determined the groups G for which (G,N) is realizable. In this paper, fixing G to be a cyclic group instead, we shall give a complete characterization of the groups N for which (G,N) is realizable.
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