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$d_{3}$
AND THE FOURIER COEFFICIENT OF HECKE–MAASS FORMSLet 
$\{{\it\phi}_{j}(z):j\geq 1\}$
be an orthonormal basis of Hecke–Maass cusp forms with Laplace eigenvalue 
$1/4+t_{j}^{2}$
. Let 
${\it\lambda}_{j}(n)$
be the 
$n$
th Fourier coefficient of 
${\it\phi}_{j}$
and 
$d_{3}(n)$
the divisor function of order three. In this paper, by the circle method and the Voronoi summation formula, the average value of the shifted convolution sum for 
$d_{3}(n)$
and 
${\it\lambda}_{j}(n)$
is considered, leading to the estimate where the implied constant depends only on 
$$\begin{eqnarray}\displaystyle \mathop{\sum }_{n\leq X}d_{3}(n){\it\lambda}_{j}(n-1)\ll X^{29/30+{\it\varepsilon}}, & & \displaystyle \nonumber\end{eqnarray}$$
$t_{j}$
and 
${\it\varepsilon}$
.
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