A Local-global Summation Formula for Abelian Varieties

Abstract

Let K be a field finitely generated over , and A an Abelian variety defined over K. Then by the Mordell-Weil Theorem, the set of rational points A(K) is a finitely-generated Abelian group. In this paper, assuming Tate's Conjecture on algebraic cycles, we prove a limit formula for the Mordell-Weil rank of an arbitrary family of Abelian varieties A over a number field k; this is the Abelian fibration analogue of the Nagao formula for elliptic surfaces E, originally conjectured by Nagao, and proven by Rosen and Silverman to be equivalent to Tate's Conjecture for E. We also give a short exact sequence relating the Picard Varieties of the family A, the parameter space, and the generic fiber, and use this to obtain an isomorphism (modulo torsion) relating the Neron-Severi group of A to the Mordell-Weil group of A.

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