On p-adic L-functions for symplectic representations of GL(N) over number fields

Abstract

Let F be a number field, and π a regular algebraic cuspidal automorphic representation of GLN(AF) of symplectic type. When π is spherical at all primes p|p, we construct a p-adic L-function attached to any regular non-critical spin p-refinement π of π to Q-parahoric level, where Q is the (n,n)-parabolic. More precisely, we construct a distribution Lp(π) on the Galois group Galp of the maximal abelian extension of F unramified outside p∞, and show that it interpolates all the standard critical L-values of π at p (including, for example, cyclotomic and anticyclotomic variation when F is imaginary quadratic). We show that Lp(π) satisfies a natural growth condition; in particular, when π is ordinary, Lp(π) is a (bounded) measure on Galp. As a corollary, when π is unitary, has very regular weight, and is Q-ordinary at all p|p, we deduce non-vanishing L(π×(χ NF/Q),1/2) ≠ 0 of the twisted central value for all but finitely many Dirichlet characters χ of p-power conductor.