Nonlinear embeddings of spaces of continuous functions
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Publication:5218201
DOI10.1090/proc/14798zbMath1448.46023OpenAlexW2982393929WikidataQ122112894 ScholiaQ122112894MaRDI QIDQ5218201
André Luis Porto da Silva, Elói Medina Galego
Publication date: 2 March 2020
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/proc/14798
Classical Banach spaces in the general theory (46B25) Banach spaces of continuous, differentiable or analytic functions (46E15)
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Cites Work
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- An optimal nonlinear extension of Banach-Stone theorem
- Coarse version of the Banach-Stone theorem
- A note on isometries between spaces of continuous functions
- Multiplicatively range-preserving maps between Banach function algebras
- M-structure and the Banach-Stone theorem
- On extremely regular function spaces
- Every separable metric space is Lipschitz equivalent to a subset of \(C_0\)
- Remarques sur un article de Israel Aharoni sur les prolongements lipschitziens dans \(c_0\)
- Embeddings into \(c_ 0\)
- Diameter preserving maps on function spaces
- Low distortion embeddings of some metric graphs into Banach spaces
- Spaces of continuous functions (III) (Spaces C(Ω) for Ω without perfect subsets)
- Into Isomorphisms of Spaces of Continuous Functions
- Small Into-Isomorphisms Between Spaces of Continuous Functions
- A Holsztyński theorem for spaces of continuous vector-valued functions
- A Generalization of the Banach-Stone Theorem
- Best constants for Lipschitz embeddings of metric spaces into c0
- Continuous mappings induced by isometries of spaces of continuous functions
- Linear isometries between subspaces of continuous functions
- Applications of the Theory of Boolean Rings to General Topology
