A finer Tate duality theorem for local Galois symbols

Abstract

Let K be a finite extension of Qp. Let A, B be abelian varieties over K of good reduction. For any integer m≥ 1, we consider the Galois symbol K(K;A,B)/m→ H2(K,A[m] B[m]), where K(K;A,B) is the Somekawa K-group attached to A,B. This map is a generalization of the Galois symbol K2M(K)/m→ H2(K,μm 2) of the Bloch-Kato conjecture, where K2M(K) is the Milnor K-group of K. In this paper we give a geometric description of the image of this generalized Galois symbol by looking at the Tate duality pairing H2(K,A[m] B[m])×HomGK(A[m],B[m])→Z/m, where B is the dual abelian variety of B. Under this perfect pairing we compute the exact annihilator of the image of the Galois symbol in terms of an object of integral p-adic Hodge theory.