Minimal Hopf-Galois Structures on Separable Field Extensions

Abstract

In Hopf-Galois theory, every H-Hopf-Galois structure on a field extension K/k gives rise to an injective map F from the set of k-sub-Hopf algebras of H into the intermediate fields of K/k. Recent papers on the failure of the surjectivity of F reveal that there exist many Hopf-Galois structures for which there are many more subfields than sub-Hopf algebras. This paper surveys and illustrates group-theoretical methods to determine H-Hopf-Galois structures on finite separable extensions in the extreme situation when H has only two sub-Hopf algebras.