双李普西茨算子的扩展

Pub Date : 2024-04-02 DOI:10.4995/agt.2024.20296

E. Dahia

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引用次数: 1

摘要

本文涉及有关双利浦齐兹算子类的一些进一步结果。我们首先证明了双利浦齐兹算子和利浦齐兹算子的等距同构鉴定。在定义并描述了双利浦齐兹算子的邻接点之后，我们证明了关于邻接点紧凑性的绍德式定理。我们研究了双 Lipschitz 算子从巴拿赫空间的两个互补子空间的笛卡尔积向整个空间的笛卡尔积的扩展。此外，我们还证明，在对多曼空间的一些要求下，定义在两个尖度量空间的笛卡尔积上的每一个双利普希兹函数都允许具有相同双利普希兹规范的扩展。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The extension of two-Lipschitz operators

The paper deals with some further results concerning the class of two-Lipschitz operators. We prove first an isometric isomorphism identification of two-Lipschitz operators and Lipschitz operators. After defining and characterize the adjoint of two-Lipschitz operator, we prove a Schauder type theorem on the compactness of the adjoint. We study the extension of two-Lipschitz operators from cartesian product of two complemented subspaces of a Banach space to the cartesian product of whole spaces. Also, we show that every two-Lipschitz functional defined on cartesian product of two pointed metric spaces admits an extension with the same two-Lipschitz norm, under some requirements on domaine spaces.

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