Quantum variance for cubic moment of Hecke--Maass cusp forms and Eisenstein series
Abstract
In this paper, we give the upper bounds on the variance for cubic moment of Hecke--Maass cusp forms and Eisenstein series respectively. For the cusp form case, the bound comes from a large sieve inequality for symmetric cubes. We also give some nontrivial bounds for higher moments of symmetric cube L-functions. For the Eisenstein series case, the upper bound comes from Lindel\"of-on-average type bounds for various L-functions. In particular, we establish the sharp upper bounds for the fourth moment of GL(2)× GL(2) L-functions and the eighth moment of GL(2) L-functions around special points 1/2+itj. Our proof is based on the work of Chandee and Li C-L20 about bounding the second moment of GL(4)× GL(2) L-functions.
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