Classification of the types for which every Hopf--Galois correspondence is bijective

Abstract

Let L/K be any finite Galois extension with Galois group G. It is known by Chase and Sweedler that the Hopf--Galois correspondence is injective for every Hopf--Galois structure on L/K, but it need not be bijective in general. Hopf--Galois structures are known to be related to skew braces, and recently, the first-named author and Trappeniers proposed a new version of this connection with the property that the intermediate fields of L/K in the image of the Hopf--Galois correspondence are in bijection with the left ideals of the associated skew brace. As an application, they classified the groups G for which the Hopf--Galois correspondence is bijective for every Hopf--Galois structure on any G-Galois extension. In this paper, using a similar approach, we shall classify the groups N for which the Hopf--Galois correspondence is bijective for every Hopf--Galois structure of type N on any Galois extension.