Average behaviour of Fourier coefficients of \(j\)-symmetric power \(L\)-functions over some polynomials

IF 0.6 3区 数学 Q3 MATHEMATICS Acta Mathematica Hungarica Pub Date : 2024-09-23 DOI:10.1007/s10474-024-01467-2
A. Sarkar, M. Shahvez Alam
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Abstract

We establish the asymptotics of the second moment of the coefficient of \(j\)-th symmetric poower lift of classical Hecke eigenforms over certain polynomials, given by a sum of triangular numbers with certain positive coefficients. More precisely, for each \(j \in \mathbb{N}\), we obtain asymptotics for the sums given by

$$\sum_{\substack{\alpha(\underline{x}))+1\le X \\ \underline{x} \in {\mathbb Z}^{4}}} \lambda_{ sym^{j}f}^{2}(\alpha(\underline{x})+1) ,\quad \sum_{\substack{\beta(\underline{x}))+1\le X \\ \underline{x} \in {\mathbb Z}^{4}}}\lambda_{ sym^{j}f}^{2}(\beta(\underline{x})+1)$$

, where \(\lambda_{ sym^{j}f}^{2}(n)\) denotes the coefficient of \(j\)-th symmetric power lift of classical Hecke eigenforms \(f\), the polynomials \(\alpha\) and \(\beta\) are given by

$$\alpha(\underline{x}) = \frac{1}{2} \big( x_{1}^{2}+ x_{1} + x_{2}^{2} + x_{2} + 2 ( x_{3}^{2} + x_{3}) + 4 (x_{4}^{2} + x_{4}) \big) \in \mathbb {Q}[x_{1},x_{2},x_{3},x_{4}], $$

and

$$\beta(\underline{x}) = x_{1}^{2} + \frac{x_{2}(x_{2} + 1)}{2} + \frac{x_{3}(x_{3}+1)}{2} + 6\cdot \frac{x_{4}( x_{4}+1)}{2} \in {\mathbb Q}[x_{1},x_{2},x_{3},x_{4}]$$
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一些多项式上的α-对称幂函数的傅里叶系数的平均行为
我们建立了经典赫克特征形式在某些多项式上的第\(j\)-th对称poower提升的系数的第二矩的渐近线,该系数由具有某些正系数的三角形数的和给出。更准确地说,对于每一个(j 在{\mathbb{N}\中),我们都会得到由 $$\sum_{\substack\alpha(\underline{x}))+1\le X \\\underline{x} 给出的和的渐近性。\在{\mathbb Z}^{4}}}\lambda_{ sym^{j}f}^{2}(\alpha(\underline{x})+1) ,\quad \sum_{\substack{beta(\underline{x}))+1\le X \\underline{x}\其中 \(\lambda_{ sym^{j}f}^{2}(n)\) 表示经典 Hecke 特征形式 \(f\) 的第 \(j\) -th 次对称幂举的系数、多项式 \(α) 和 \(β) 由 $$\α(\underline{x}) = \frac{1}{2} 给出\big( x_{1}^{2}+ x_{1}+ x_{2}^{2}+ x_{2}+ 2 ( x_{3}^{2} + x_{3}) + 4 (x_{4}^{2} + x_{4}) \big) \in \mathbb {Q}[x_{1},x_{2},x_{3},x_{4}],$$and $$\beta(\underline{x}) = x_{1}^{2}+ \frac{x_{2}(x_{2} + 1)}{2}+ \frac{x_{3}(x_{3}+1)}{2} + 6\cdot \frac{x_{4}( x_{4}+1)}{2}\in {\mathbb Q}[x_{1},x_{2},x_{3},x_{4}]$$
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来源期刊
CiteScore
1.50
自引率
11.10%
发文量
77
审稿时长
4-8 weeks
期刊介绍: Acta Mathematica Hungarica is devoted to publishing research articles of top quality in all areas of pure and applied mathematics as well as in theoretical computer science. The journal is published yearly in three volumes (two issues per volume, in total 6 issues) in both print and electronic formats. Acta Mathematica Hungarica (formerly Acta Mathematica Academiae Scientiarum Hungaricae) was founded in 1950 by the Hungarian Academy of Sciences.
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