Joint cubic moment of Eisenstein series and Hecke-Maass cusp forms
Abstract
Let be a smooth compactly supported function on X = SL(2,Z). In this paper, we are interested in the joint cubic moments of automorphic forms when the spectral parameters go to infinity. We show that the diagonal case for Eisenstein series ∫X(z)E(z,1/2+it)3 dμ z = O(t-1/3+). In off-diagonal case we prove 12 t∫X(z)|E(z,1/2+it)|2g(z)dμ z = o(1) as long as \t , tg\ → ∞. Finally we show ∫X(z)f2(z)g(z)dμ z = o(1) in the range |tf - tg| ≤ tf2/3- where f,g are two Hecke-Maass cusp forms.
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