Real-valued Lipschitz functions and metric properties of functions
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Publication:2304320
DOI10.1016/j.jmaa.2020.123839zbMath1448.54006OpenAlexW2999618095WikidataQ126403772 ScholiaQ126403772MaRDI QIDQ2304320
M. Isabel Garrido, Gerald A. Beer
Publication date: 9 March 2020
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jmaa.2020.123839
Lipschitz spaceslocally Lipschitz functionCauchy continuous functionLipschitz in the small functionuniformly continuous function
Related Items (4)
Cauchy-subregular functions vis-à-vis different types of continuity ⋮ Stability of Lipschitz-type functions under pointwise product and reciprocation ⋮ Split Lipschitz-type functions ⋮ On some Lipschitz-type functions
Cites Work
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- On the uniform approximation of Cauchy continuous functions
- Functions that are Lipschitz in the small
- Uniform continuity, uniform convergence, and shields
- On embedding uniform and topological spaces
- Uniform continuity of continuous functions of metric spaces
- Atsuji completions: Equivalent characterisations
- Lectures on analysis on metric spaces
- More on variants of complete metric spaces
- Preservation of uniform continuity under pointwise product
- Lipschitz functions
- Uniform continuity and a new bornology for a metric space
- The Samuel realcompactification of a metric space
- Approximation of continuous functions by Lipschitz functions
- Homomorphisms on function lattices
- Bornological convergence and shields
- Stability of Lipschitz-type functions under pointwise product and reciprocation
- McShane's extension theorem revisited
- On strongly Čech-complete spaces
- The Lipschitz metric for real-valued continuous functions
- Locally Lipschitz functions, cofinal completeness, and UC spaces
- Lipschitz-type functions on metric spaces
- Strong uniform continuity
- Rings of functions with certain Lipschitz properties
- BORNOLOGIES AND LOCALLY LIPSCHITZ FUNCTIONS
- More about metric spaces on which continuous functions are uniformly continuous
- Mappings that preserve Cauchy sequences
- Rings of functions in Lipschitz topology
- U(X) as a ring for metric spaces X
- New types of completeness in metric spaces
- A Short Proof of the Arens-Eells Embedding Theorem
- Extension of functions satisfying a Lipschitz condition
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