Abelian maps, bi-skew braces, and opposite pairs of Hopf-Galois structures

Abstract

Let G be a finite nonabelian group, and let :G G be a homomorphism with abelian image. We show how gives rise to two Hopf-Galois structures on a Galois extension L/K with Galois group (isomorphic to) G; one of these structures generalizes the construction given by a ``fixed point free abelian endomorphism'' introduced by Childs in 2013. We construct the skew left brace corresponding to each of the two Hopf-Galois structures above. We will show that one of the skew left braces is in fact a bi-skew brace, allowing us to obtain four set-theoretic solutions to the Yang-Baxter equation as well as a pair of Hopf-Galois structures on a (potentially) different finite Galois extension.