The Realizability Problem with Inertia Conditions

Abstract

In this paper, we consider the inverse Galois problem with described inertia behavior. For a finite group G, one of its subgroups I and a prime integer p, we ask whether or not G and I can be realized as the Galois group and the inertia subgroup at p of an extension of Q. We first discuss the result when G is an abelian group. Then in the case that G is of odd order, Neukirch showed that there exists such an extension if and only if the given inertia condition is realizable over Qp, from which we obtain the answer for this case by studying the structure of extensions of Qp and applying techniques from embedding problems. As a corollary, we give an explicit presentation of the Galois group of the maximal pro-odd extension of Qp. When G=GL2(Fp) for an odd prime p, we relate our realizability problem to modular Galois representations and use elliptic curves to give answers for those subgroups I corresponding to weight 2 modular forms. Finally, we provide an example arising from Grunwald-Wang's counterexample for which the local-global principle of our realizability problem fails.