Shifted convolution sums for $GL(3)\times GL(2)$

Details Shifted convolution sums for $GL(3)\times GL(2)$ Shifted convolution sums for $GL(3)\times GL(2)$

2012-02-06

arxiv.org/abs/1202.1157v1

Mathematics

Number Theory

Scientific paper

For the shifted convolution sum $$ D_h(X)=\sum_{m=1}^\infty\lambda_1(1,m)\lambda_2(m+h)V(\frac{m}{X}) $$ where $\lambda_1(1,m)$ are the Fourier coefficients of a $SL(3,\mathbb Z)$ Maass form $\pi_1$, and $\lambda_2(m)$ are those of a $SL(2,\mathbb Z)$ Maass or holomorphic form $\pi_2$, and $1\leq |h| \ll X^{1+\varepsilon}$, we establish the bound $$ D_h(X)\ll_{\pi_1,\pi_2,\varepsilon} X^{1-(1/20)+\varepsilon}. $$ The bound is uniform with respect to the shift $h$.

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