Kolyvagin classes versus non-cristalline diagonal classes
Abstract
Let E/Q be an elliptic curve having multiplicative reduction at a prime p. Let (g,h) be a pair of eigenforms of weight 1 arising as the theta series of an imaginary quadratic field K, and assume that the triple-product L-function L(f,g,h,s) is self-dual and does not vanish at the central critical point s=1. The main result of this article is a formula expressing the p-adic iterated integrals introduced in [DLR] to the Kolyvagin classes associated by Bertolini and Darmon to a system of Heegner points on E.
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