Pontryagin duality for Iwasawa modules and abelian varieties
Abstract
We prove a functional equation for two projective systems of finite abelian p-groups, \n\ and \n\, endowed with an action of pd such that n can be identified with the Pontryagin dual of n for all n. Let K be a global field. Let L be a pd-extension of K (d≥ 1), unramified outside a finite set of places. Let A be an abelian variety over K. We prove an algebraic functional equation for the Pontryagin dual of the Selmer group of A.
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