Exceptional zeros of Rankin-Selberg L-functions and joint Sato-Tate distributions

Abstract

Let be an idele class character over a number field F, and let π,π' be non-dihedral twist-inequivalent cuspidal automorphic representations of GL2(AF). We prove that if m,n≥ 0 are integers, m+n≥ 1, F is totally real, corresponds with a ray class character, and π,π' correspond with primitive non-CM holomorphic Hilbert cusp forms, then the Rankin--Selberg L-function L(s,Symm(π)×(Symn(π'))) has a standard zero-free region with no exceptional Landau--Siegel zero. This is new even for F=Q. As an application, we establish the strongest known unconditional effective rates of convergence in the Sato--Tate distribution for π and the joint Sato--Tate distribution for π and π'.

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