A metric approach to zero-free regions for L-functions
Abstract
For integers m, m' 1, let π and π' be cuspidal automorphic representations of GL(m) and GL(m'), respectively. We present a new proof of zero-free regions for L(s, π) and for L(s, π× π') under the assumption that π, π' or L(s,π× π') is self-dual. Our approach builds on ideas of "pretentious" multiplicative functions due to Granville and Soundararajan (as presented by Koukoulopoulos) and the notion of a positive semi-definite family of automorphic representations due to Lichtman and Pascadi.
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