Proof of the Strong Ivi\'c Conjecture for the Cubic Moment of Maass-form L-functions

Abstract

In this paper, we prove the following asymptotic formula for the spectral cubic moment of central L-values: Σtf ≤slant T 2 L ( 1 2 , f )3 L(1, Sym2 f) + 2 π ∫0T | ζ ( 1 2 + it ) |6 | ζ (1 + 2 it ) |2 d t = T2 P3 ( T) + O (T1+) , where f ranges in an orthonormal basis of (even) Hecke--Maass cusp forms, and P3 is a certain polynomial of degree 3. It improves on the error term O (T8/7+) in a paper of Ivi\'c and hence confirms his strong conjecture for the cubic moment. This is the first time that the (strong) moment conjecture is fully proven in a cubic case. Moreover, we establish the short-interval variant of the above asymptotic formula on intervals of length as short as T.