Duality and distance formulas in Lipschitz-H\"older spaces

Francesca Angrisani; Giacomo Ascione; Luigi D'Onofrio; Gianluigi Manzo

arXiv:1912.05187·math.FA·December 12, 2019

Duality and distance formulas in Lipschitz-H\"older spaces

Francesca Angrisani, Giacomo Ascione, Luigi D'Onofrio, Gianluigi Manzo

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TL;DR

This paper explores duality, atomic decomposition, and isometric isomorphisms in Lipschitz-Hölder spaces on compact metric spaces, connecting these spaces with measure theory and o-O type structures.

Contribution

It establishes atomic decomposition of measures, clarifies duality relationships, and frames Lipschitz-Hölder spaces within the theory of o-O structures.

Findings

01

Atomic decomposition of $M(K)$ using previous results

02

Isometric isomorphism between $Lip(K, ho)$ and $(lip(K, ho))_{**}$

03

Framing of Lipschitz-Hölder spaces within o-O type structures

Abstract

For a compact metric space $(K, ρ)$ , the predual of $L i p (K, ρ)$ can be identified with the normed space $M (K)$ of finite (signed) Borel measures on $K$ equipped with the Kantorovich-Rubinstein norm, this is due to Kantorovich [20]. Here we deduce atomic decomposition of $M (K)$ by mean of some results from [10]. It is also known, under suitable assumption, that there is a natural isometric isomorphism between $L i p (K, ρ)$ and $(l i p (K, ρ))_{**}$ [15]. In this work we also show that the pair $(l i p (K, ρ), L i p (K, ρ))$ can be framed in the theory of o-O type structures introduced by K. M. Perfekt.

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