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2-Local Isometries on Spaces of Lipschitz Functions

Published online by Cambridge University Press:  20 November 2018

A. Jiménez-Vargas  and
Moisés Villegas-Vallecillos
A. Jiménez-Vargas
Affiliation:
Departamento de Álgebra y Análisis Matemático, Universidad de Almería, 04120 Almería, Spaine-mail: ajimenez@ual.ese-mail: mvv042@alboran.ual.es
Moisés Villegas-Vallecillos
Affiliation:
Departamento de Álgebra y Análisis Matemático, Universidad de Almería, 04120 Almería, Spaine-mail: ajimenez@ual.ese-mail: mvv042@alboran.ual.es
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Abstract

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Let $(X,\,d)$ be a metric space, and let $\text{Lip(}X\text{)}$ denote the Banach space of all scalar-valued bounded Lipschitz functions $f$ on $X$ endowed with one of the natural norms

$$\left\| f \right\|\,=\,\max \{{{\left\| f \right\|}_{\infty }},\,L(f)\}\,\,\text{or}\,\,\left\| f \right\|\,=\,{{\left\| f \right\|}_{\infty }}\,+\,L(f),$$

where $L(f)$ is the Lipschitz constant of $f$. It is said that the isometry group of $\text{Lip(}X\text{)}$ is canonical if every surjective linear isometry of $\text{Lip(}X\text{)}$ is induced by a surjective isometry of $X$. In this paper we prove that if $X$ is bounded separable and the isometry group of $\text{Lip(}X\text{)}$ is canonical, then every 2-local isometry of $\text{Lip(}X\text{)}$ is a surjective linear isometry. Furthermore, we give a complete description of all 2-local isometries of $\text{Lip(}X\text{)}$ when $X$ is bounded.

Keywords

46B0446J1046E15isometrylocal isometryLipschitz function
Type
Research Article
Information
Canadian Mathematical Bulletin , Volume 54 , Issue 4 , 01 December 2011 , pp. 680 - 692
Copyright
Copyright © Canadian Mathematical Society 2011

References

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