Shifted Convolution Sum for GL(3) × GL(2) with Weighted Average

Abstract

In this paper, we will prove the non-trivial bound for the weighted average version of shifted convolution sum for GL(3)× GL(2), i.e. for any ε >0 and X1/4+δ ≤ H ≤ X with δ >0, \[ 1HΣh=1∞ λf(h) V( hH)Σn=1∞ λπ(1,n) λg (n+h) W( nX ) X1-δ+ε \] where V,W are smooth compactly supported funtions, λf(n), λg(n) and λπ(1,n) are the normalized n-th Fourier coefficients of SL(2,Z) Hecke-Maass cusp forms f,g and SL(3,Z) Hecke-Maass cusp form π, respectively.