On shifted convolution sums of GL(3)-Fourier coefficients with an average over shifts
Abstract
Let F be a Hecke-Maass cusp form for SL3(Z) and A(m,n) be its normalized Fourier coefficients. Let V be a smooth function, compactly supported on [1,2] and satisfying V(y)j j y-j for any j ∈ N \0\. In this article we prove a power-saving upper bound for the `average' shifted convolution sum equation* ΣhΣnA(1,n)A(1,n+h)V(nN)V(hH), equation* for the range N1/2- ≥ H ≥ N1/6+ , for any >0. This is an improvement over the previously known range N1/2- ≥ H ≥ N1/4+ .
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