$L^2(\mathbb{R})$ 上的 Hardy 算子

数学物理学报 ›› 2026, Vol. 46 ›› Issue (1): 58-68.

$L^2(\mathbb{R})$ 上的 Hardy 算子

李然^*(), 张成佳()

辽宁师范大学数学学院辽宁大连 116082

收稿日期:2024-12-10 修回日期:2025-07-19 出版日期:2026-02-26 发布日期:2026-01-19
通讯作者: 李然 E-mail:liranmika@163.com;13188027476@163.com
作者简介:张成佳, Email: 13188027476@163.com
基金资助:
国家自然科学基金(11901269);辽宁省教育厅自然科学类项目(JYTMS20231041)

The Hardy Operator on $L^2(\mathbb{R})$

Ran Li^*(), Chengjia Zhang()

School of Mathematics, Liaoning Normal University, Liaoning Dalian 116082

Received:2024-12-10 Revised:2025-07-19 Online:2026-02-26 Published:2026-01-19
Contact: Ran Li E-mail:liranmika@163.com;13188027476@163.com
Supported by:
NSFC(11901269);Natural Science Project of the Department of Education of Liaoning Province(JYTMS20231041)

摘要/Abstract

摘要：

该文研究定义在 $L^2(\mathbb{R})$ 空间上的 Hardy 算子 $H_{\mathbb{R}}$. 通过引入与拉盖尔多项式相关的正交基, 证明了算子 $I - H_{\mathbb{R}}$ 在 $L^2(\mathbb{R})$ 上为等距移位算子, 并进一步分析了其伴随算子的性质, 证明了 $I - H_{\mathbb{R}}^{*}$ 同样为等距移位算子且满足 $(I - H_{\mathbb{R}})(I - H_{\mathbb{R}}^{*}) = I$, 从而得出 $H_{\mathbb{R}}$ 的算子范数为 2. 此外, 深入探讨了 $H_{\mathbb{R}}$ 的谱结构, 证明其谱位于以 $(1,0)$ 为圆心且半径为 1 的复平面圆周上, $H_{\mathbb{R}}$ 点谱为空集. 最后, 推广了 Hardy 算子的定义, 考虑了加权版本的 Hardy 算子, 并展示了其在求解特定一阶微分方程中的应用.

关键词: Hardy 算子, Schur 检验, 等距移位算子

Abstract:

In this paper, we study the Hardy operator $H_{\mathbb{R}} $ defined on the space $ L^2(\mathbb{R})$. By introducing an orthogonal basis associated with Laguerre polynomials, we prove that the operator $ I - H_{\mathbb{R}} $ acts as an isometric shift on $ L^2(\mathbb{R})$. We further analyze the properties of its adjoint and establish that $ I - H_{\mathbb{R}}^*$ is also an isometric shift, satisfying $(I - H_{\mathbb{R}})(I - H_{\mathbb{R}}^*) = I,$ which implies that the operator norm of $ H_{\mathbb{R}}$ is 2. Moreover, we investigate the spectral structure of $H_{\mathbb{R}} $ in detail, proving that its spectrum lies on the circle in the complex plane centered at $ (1,0)$ with radius 1, and that $ H_{\mathbb{R}}$ has an empty point spectrum. Finally, we generalize the definition of the Hardy operator by considering a weighted version and demonstrate its application to solving certain first-order differential equations.

Key words: Hardy operator, Schur test, equidistant shift operator

中图分类号:

O177.3

李然, 张成佳. $L^2(\mathbb{R})$ 上的 Hardy 算子[J]. 数学物理学报, 2026, 46(1): 58-68.

Ran Li, Chengjia Zhang. The Hardy Operator on $L^2(\mathbb{R})$[J]. Acta mathematica scientia,Series A, 2026, 46(1): 58-68.

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