Integrality of p-Adic L-Functions at Eisenstein Primes

Abstract

Let f be a normalized, ordinary newform of weight 2. For each prime p of F=Q(an)n∈ N, there is an associated p-adic L-function Lp(f)∈ Q interpolating special values of the classical L-function. If f is not congruent modulo p to an Eisenstein series, one knows Lp(f)∈ . In this paper, we show, under mild hypotheses on the ramification of f, that this integrality result holds when f is congruent to an Eisenstein series. Moreover, we also obtain a divisibility in the main conjecture for Lp(f). As an application, we show that the integrality result and the divisibility hold in particular when f is of weight 2.

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