On the Fourth Power Moment of the Error Term for the Divisor Problem with Congruence Conditions

TL;DR

This paper derives an asymptotic formula for the fourth power moment of the error term in a divisor problem with congruence conditions, improving the known bounds on the error term.

Contribution

It establishes a new asymptotic formula for the fourth power moment of the error term, with a better error bound than previous results.

Findings

Asymptotic formula for the fourth power moment of the error term.

Improved error bound with =1/8, better than previous =3/28.

Enhanced understanding of divisor problem with congruence conditions.

Abstract

Let $d(n;\ell_1,M_1,\ell_2,M_2)$ denote the number of factorizations $n=n_1n_2$, where each of the factors $n_i\in\mathbb{N}$ belongs to a prescribed congruence class $\ell_i\bmod M_i\,(i=1,2)$. Let $\Delta(x;\ell_1,M_1,\ell_2,M_2)$ be the error term of the asymptotic formula of $\sum\limits_{n\leqslant x}d(n;\ell_1,M_1,\ell_2,M_2)$. In this paper, we establish an asymptotic formula of the fourth power moment of $\Delta(M_1M_2x;\ell_1,M_1,\ell_2,M_2)$ and prove that \begin{equation*} \int_1^T\Delta^4(M_1M_2x;\ell_1,M_1,\ell_2,M_2)\mathrm{d}x=\frac{1}{32\pi^4}C_4\Big(\frac{\ell_1}{M_1},\frac{\ell_2}{M_2}\Big) T^2+O(T^{2-\vartheta_4+\varepsilon}), \end{equation*} with $\vartheta_4=1/8$, which improves the previous value $\theta_4=3/28$ of K. Liu.