关于一般乘积𝐿函数的傅里叶系数

Mathematica Pannonica Pub Date : 2024-02-01 DOI:10.1556/314.2024.00003

Guodong Hua

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引用次数: 0

摘要

设 𝑓 是全模态群 Γ = 𝑆𝐿(2, ℤ)的偶数积分权的归一化原始尖顶形式。在本文中，我们将研究与褶积𝐿 函数的傅里叶系数𝜆 𝑓 ⊗𝑓 ⊗⋯⊗𝑙𝑓 (𝑛) 的平均行为有关的误差项的上限、其中，𝑓 ⊗ 𝑓 ⋯ ⊗𝑙 𝑓 表示𝑓的𝑙折积。这些结果改进并推广了 Venkatasubbareddy 和 Sankaranarayanan [41] 的最新研究成果。我们还提供了一些与一般乘积𝐿 函数误差项相关的其他类似结果。

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On the Fourier Coefficients for General Product 𝐿-Functions

Let 𝑓 be a normalized primitive cusp form of even integral weight for the full modular group Γ = 𝑆𝐿(2, ℤ). In this paper, we investigate upper bounds for the error terms related to the average behavior of Fourier coefficients 𝜆𝑓 ⊗𝑓 ⊗⋯⊗𝑙𝑓 (𝑛) of 𝑙-fold product 𝐿-functions, where 𝑓 ⊗ 𝑓 ⊗ ⋯ ⊗𝑙 𝑓 denotes the 𝑙-fold product of 𝑓. These results improves and generalizes the recent developments of Venkatasubbareddy and Sankaranarayanan [41]. We also provide some other similar results related to the error terms of general product 𝐿-functions.

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Mathematica Pannonica

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