Functional equations for supersingular abelian varieties over Zp2-extensions
Abstract
Let K be an imaginary quadratic field and K∞ be the Zp2-extension of K. Answering a question of Ahmed and Lim, we show that the Pontryagin dual of the Selmer group associated to a supersingular polarized abelian variety admits an algebraic functional equation. The proof uses the theory of -system developed by Lai, Longhi, Tan and Trihan. We also show the algebraic functional equation holds for Sprung's chromatic Selmer groups of supersingular elliptic curves along K∞.
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