Bad places for the approximation property for finite groups

Abstract

Given a number field k and a finite k-group G, the Tame Approximation Problem for G asks whether the restriction map H1(k,G)Πv∈H1(kv,G) is surjective for every finite set of places ⊂eqk disjoint from BadG, where BadG is the finite set of places that either divides the order of G or ramifies in the minimal extension splitting G. In this paper we prove that the set BadG is "sharp". To achieve this we prove that there are finite abelian k-groups A where the map H1(k,A)Πv∈0H1(kv,A) is not surjective in a set 0⊂eqBadA with particular properties, namely 0 is the set of places that do not divide the order of A and ramify in the minimal extension splitting A.