Towards a Generalisation of Noether's Theorem to Nonclassical Hopf-Galois Structures

Abstract

We study the nonclassical Hopf-Galois module structure of rings of algebraic integers in some extensions of p -adic fields and number fields which are at most tamely ramified. We show that if L/K is an unramified extension of p -adic fields which is H -Galois for some Hopf algebra H then is free over its associated order in H . If H is commutative, we show that this conclusion remains valid in ramified extensions of p -adic fields if p does not divide the degree of the extension. By combining these results we prove a generalisation of Noether's theorem to nonclassical Hopf-Galois structures on domestic extensions of number fields.