On an unconditional GL3 analog of Selberg's result
Abstract
Let F be a Hecke--Maass cusp form for SL3(Z) with the Langlands parameter μF=(μF,1,μF,2,μF,3) and the associated L-function L(s, F). Define SF(t)=π-1 L(1/2+it, F). When μF is in generic position, we establish an unconditional asymptotic formula for the moments of SF(t). Previously, such a formula was only known to hold under the Generalized Riemann Hypothesis. The key ingredient is a weighted zero-density estimate in the spectral aspect for L(s, F), which has recently been proved by Sun and Wang in arXiv:2412.02416.
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