A generalized Rubin formula for Hecke characters
Abstract
The goal of this paper is to generalize Rubin's theorem on values of Katz's p-adic L-function outside the range of interpolation from the case of Hecke characters of CM elliptic curves to more general self-dual algebraic Hecke characters. We follow the approach by Bertolini-Darmon-Prasanna, based on generalized Heegner cycles, which we extend from characters of imaginary quadratic fields of infinity type (1,0) to characters of infinity type (1+,-) for an integer ≥0.
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