Average shifted convolution sum for GL(d1)× GL(d2)
Abstract
We study the average shifted convolution sum B(H,N):= 1H Σh H Σn N Aπ1(n)\, Aπ2(n+h), where Aπi(n) denotes the Fourier coefficients of a Hecke--Maass cusp form πi for SL(di,Z) with di 4, i=1,2. We establish a nontrivial power-saving bound of B(H,N) for the range of the shift H N1-4d1+d2+ for any >0. For the cases d1 = d2 + 1 and d1 = d2, our result extends a result that can be derived from a theorem of Friedlander and Iwaniec. In particular, when d1 = d2, we reach the critical threshold H N1-2/d+ such that any further improvement in this range yields a subconvexity bound for the corresponding standard L-function in the t-aspect.
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