A shifted convolution sum for GL(3)× GL(2)
Abstract
In this paper, we estimate the shifted convolution sum \[Σn≥slant1λ1(1,n)λ2(n+h)V(nX),\] where V is a smooth function with support in [1,2], 1≤slant|h|≤slant X, λ1(1,n) and λ2(n) are the n-th Fourier coefficients of SL(3,Z) and SL(2,Z) Hecke-Maass cusp forms, respectively. We prove an upper bound O(X2122+), updating a recent result of Munshi.
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