Non-cuspidal Hida theory for Siegel modular forms and trivial zeros of p-adic L-functions
Abstract
We study the derivative of the standard p-adic L-function associated with a P-ordinary Siegel modular form (for P a parabolic subgroup of GL(n)) when it presents a semi-stable trivial zero. This implies part of Greenberg's conjecture on the order and leading coefficient of p-adic L-functions at such trivial zero. We use the method of Greenberg-Stevens. For the construction of the improved p-adic L-function we develop Hida theory for non-cuspidal Siegel modular forms.
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