Tatuzawa's theorem for Rankin-Selberg L-functions

Abstract

Let π and π' be unitary cuspidal automorphic representations of GL(n) and GL(n') over a number field F. We establish a new zero-free region for all GL(1)-twists of the Rankin-Selberg L-function L(s,π×π'), generalizing Tatuzawa's refinement of Siegel's work on Dirichlet L-functions. As a corollary, we show that for all >0, there exists an effectively computable constant c>0 depending only on (n,n',[F:Q],) such that L(s,π×π') has at most one zero (necessarily simple) in the region \[ Re(s)≥ 1-c/(C(π)C(π')(|Im(s)|+1)), \] where C(π) and C(π') are the analytic conductors. A crucial component of our proof is a new standard zero-free region for any twist of L(s,π×π) by an idele class character apart from a possible single exceptional zero (necessarily real and simple) that can occur only when π2=π. This extends earlier work of Humphries and Thorner.