Biseparating maps on generalized Lipschitz spaces

Leung, Denny H.

doi:10.4064/sm196-1-3

Cited by 10 publications

(7 citation statements)

References 30 publications

(37 reference statements)

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“…and Weaver [3] in their studies of the representation of surjective linear isometries of Lip(X , d) by means of weighted composition operators, and those of Araujo and Dubarbie [4] and Leung [5] on biseparating maps of Lipschitz spaces. Our approach lies in tackling the problem for pointed Lipschitz spaces Lip 0 that generalize the Lipschitz spaces Lip.…”

Section: Introduction and Statement Of The Resultsmentioning

confidence: 99%

Compact composition operators on noncompact Lipschitz spaces

Jiménez-Vargas

Villegas-Vallecillos

2013

Journal of Mathematical Analysis and Applications

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Section: Introduction and Statement Of The Resultsmentioning

confidence: 99%

Compact composition operators on noncompact Lipschitz spaces

Jiménez-Vargas

Villegas-Vallecillos

2013

Journal of Mathematical Analysis and Applications

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“…In [15], Leung defined a new class of spaces, the generalized Lipschitz function space Lip Σ (X, E). We say that σ : [0, +∞) → [0, +∞] is a modulus function if σ is nondecreasing, σ(0) = 0, and σ is continuous at 0.…”

Section: LI and Y-s Wangmentioning

confidence: 99%

“…In the sequel, all generalized Lipschitz function spaces Lip Σ (X, E) are assumed to be Lipschitz normal. In particular, Z(Lip Σ (X)) = Z(X) ( [15,Lemma 3]).…”

Section: LI and Y-s Wangmentioning

confidence: 99%

“…In 2009, Araujo and Dubarbie [7] showed that if there is a linear biseparating map between spaces of vector-valued bounded Lipschitz functions on complete metric spaces X and Y , then X and Y are Lipschitz homeomorphic. In 2010, Leung [15] extended this to generalized Lipschitz function spaces, and provided a (topological) homeomorphism between X and Y . On the other hand, Jiménez-Vargas, Villegas-Vallecillos, and Wang [13,14] worked on the same problem for spaces of vector-valued little Lipschitz functions defined on locally compact metric spaces X and Y and showed that X and Y are locally Lipschitz homeomorphic if the biseparating map is continuous.…”

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confidence: 99%

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How Lipschitz Functions Characterize the Underlying Metric Spaces

Li¹,

Wang²

2014

Can. math. bull.

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Abstract. Let X, Y be metric spaces and E, F be Banach spaces. Suppose that both X, Y are realcompact, or both E, F are realcompact. The zero set of a vector-valued function f is denoted by z( f ). A linear bijection T between local or generalized Lipschitz vector-valued function spaces is said to preserve zero-set containments or nonvanishing functions ifrespectively. Every zero-set containment preserver, and every nonvanishing function preserver when dim E = dim F < +∞, is a weighted composition operator (T f )(y) = J y ( f (τ (y))). We show that the map τ : Y → X is a locally (little) Lipschitz homeomorphism.

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“…Moreover, generalization to disjointness preserving or biseparating maps allows for extension to function spaces that are neither algebras nor lattices, and even to vector-valued functions. Copius research has been devoted to the study of disjointness preserving and biseparating maps on various function spaces; see, e.g., [1]- [8], [13], [16], [20]- [26], [29]. As far as the authors are aware of, the study of biseparating maps thus far has been confined to linear or at least additive maps.…”

Section: Introductionmentioning

confidence: 99%

Nonlinear biseparating maps

Feng,

Leung

2020

Preprint

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An additive map T acting between spaces of vector-valued functions is said to be biseparating if T is a bijection so that f and g are disjoint if and only if T f and T g are disjoint. Note that an additive bijection retains Q-linearity. For a general nonlinear map T , the definition of biseparating given above turns out to be too weak to determine the structure of T . In this paper, we propose a revised definition of biseparating maps for general nonlinear operators acting between spaces of vector-valued functions, which coincides with the previous definition for additive maps. Under some mild assumptions on the function spaces involved, it turns out that a map is biseparating if and only if it is locally determined. We then delve deeply into some specific function spaces -spaces of continuous functions, uniformly continuous functions and Lipschitz functions -and characterize the biseparating maps acting on them. As a by-product, certain forms of automatic continuity are obtained. We also prove some finer properties of biseparating maps in the cases of uniformly continuous and Lipschitz functions.

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Biseparating maps on generalized Lipschitz spaces

Cited by 10 publications

References 30 publications

Compact composition operators on noncompact Lipschitz spaces

Compact composition operators on noncompact Lipschitz spaces

How Lipschitz Functions Characterize the Underlying Metric Spaces

Nonlinear biseparating maps

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