Spectral reciprocity for GL(n) and simultaneous non-vanishing of central L-values

Abstract

Let F be a totally real number field and n 3. Let and π be cuspidal automorphic representations for PGLn+1(F) and PGLn-1(F), respectively, that are unramified and tempered at all finite places. We prove simultaneous non-vanishing of the Rankin--Selberg L-values L(1/2,σ) and L(1/2,σπ) for certain sequences of σ varying over cuspidal automorphic representations for PGLn(F) with conductor tending to infinity in the level aspect and bearing certain local conditions. Along the way, we also prove a reciprocity formula for the average of the product of Rankin--Selberg L-functions L(1/2,σ)L(1/2,σπ) over a conductor aspect family of σ.