On the arithmetic of special values of L-functions for certain abelian varieties with a rational isogeny
Abstract
Let N and p be primes ≥ 5 such that p N-1. In this situation, Mazur defined and studied the p-Eisenstein quotient J(p) of J0(N). We prove a kind of modulo p version of the Birch and Swinnerton-Dyer conjecture for the ``p-Eisenstein part'' of even quadratic twists of J(p). Our result is the analogue for even quadratic twists of a result of Mazur concerning odd quadratic twists.
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