Hopf Galois module structure of dihedral degree 2p extensions of Qp

Abstract

Let p be an odd prime. For field extensions L/Qp with Galois group isomorphic to the dihedral group D2p of order 2p, we consider the problem of computing a basis of the associated order in each Hopf Galois structure and the module structure of the ring of integers OL. We solve the case in which L/Qp is not totally ramified and present a practical method which provides a complete answer for the cases p=3 and p=5. We see that within this family of dihedral extensions, the ring of integers is always free over the associated orders in the different Hopf Galois structures.