Exceptional zeros of GL3×GL3 Rankin-Selberg L-functions
Abstract
Let be an idele class character over a number field F, and let π,π' be any two cuspidal automorphic representations of GL2(AF). We prove that the Rankin-Selberg L-function L(s,Sym2(π)×(Sym2 (π'))) has a "standard" zero-free region with no exceptional Landau-Siegel zero except possibly when it is divisible by the L-function of a real idele class character. In particular, no such zero exists if π is non-dihedral and π' is not a twist of π. Until now, this was only known when π=π', π is self-dual, and is trivial.
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