Increasing the Size of Tame Shafarevich Groups

Abstract

Let K be a number field with S a finite set of primes. We study the cohomology of Fp[GK,S]-modules A, in particular the Shafarevich groups iS(K,A) for i=1,2 and tame sets S, i.e., for sets S that contain no primes above p. When S contains all primes above p (the ``wild'' setting), it is a consequence of global Poitou--Tate duality that 1S(K,A') 2S(K,A) S(K,A) is non-increasing as S increases. A similar result holds when GK,S is replaced by its maximal pro-p quotient GK,S(p). In [5] it was shown that for S tame and A=Fp with trivial action, the group 2S(K, Fp) can increase as S increases to S X, and even attain its maximal dimension, S(K,Fp), for carefully chosen X. In the first part of this paper, we use Liu's definition [8] of S(K,A) for a general Fp[GK, S]-module A to show, assuming 1all(K,A')=0, that 2S(K,A) S(K,A). This happens, for example, when the action of GK,S on A is through a finite group of order prime to p. Under this extra assumption, we then strengthen the results of [5] to show that for any odd prime p and any Fp[GK, S]-module A with S tame, there exist infinitely many tame sets of primes X of K such that 2S X(K,A) S X(K,A) S(K,A) 2S(K,A).