Hopf Galois module structure of dihedral degree $2p$ extensions of   $\mathbb{Q}_p$

Daniel Gil-Mu\~noz; Anna Rio

arXiv:2011.05024·math.NT·May 26, 2021

Hopf Galois module structure of dihedral degree $2p$ extensions of $\mathbb{Q}_p$

Daniel Gil-Mu\~noz, Anna Rio

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Abstract

Let $p$ be an odd prime. For field extensions $L / Q_{p}$ with Galois group isomorphic to the dihedral group $D_{2 p}$ of order $2 p$ , 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 $O_{L}$ . We solve the case in which $L / Q_{p}$ 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.

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TopicsAlgebraic Geometry and Number Theory · Commutative Algebra and Its Applications · Algebraic structures and combinatorial models