The Second Moment of GL3 × GL2 L-functions at Special Points

Abstract

Let φ be a fixed Hecke--Maass form for SL3 (Z) and uj traverse an orthonormal basis of Hecke--Maass forms for SL2 (Z) . Let 1/4+tj2 be the Laplace eigenvalue of uj . In this paper, we prove the mean Lindel\"of hypothesis for the second moment of L (1/2+itj, φ × uj) on T < tj ≤slant T + T . Previously, this was proven by Young on tj ≤slant T. Our approach is more direct as we do not apply the Poisson summation formula to detect the `Eisenstein--Kloosterman' cancellation.

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