On the Shafarevich Group of Restricted Ramification Extensions of Number Fields in the Tame Case

Abstract

Let K be a number field and S a finite set of places of K. We study the kernels S of maps H2(GS,p) → v∈ S H2(v,p). There is a natural injection S S, into the dual S of a certain readily computable Kummer group VS, which is always an isomorphism in the wild case. The tame case is much more mysterious. Our main result is that given a finite X coprime to p, there exists a finite set of places S coprime to p such that S X S X X X. In particular, we show that in the tame case Y can increase with increasing Y. This is in contrast with the wild case where Y is nonincreasing in size with increasing Y.