Asplund spaces and decomposable nonseparable Banach spaces
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Publication:1912631
DOI10.1216/rmjm/1181072202zbMath0843.46011OpenAlexW1964846407MaRDI QIDQ1912631
Publication date: 18 August 1996
Published in: Rocky Mountain Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1216/rmjm/1181072202
density characterEberlein compactMarkushevich basisAsplund spaceweakly compactly generatedprojectional resolution of identityequivalent strictly convex norm
Geometry and structure of normed linear spaces (46B20) Isomorphic theory (including renorming) of Banach spaces (46B03) Summability and bases; functional analytic aspects of frames in Banach and Hilbert spaces (46B15)
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Cites Work
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- Renorming concerning Mazur's intersection property of balls for weakly compact convex sets
- Borel selectors for upper semi-continuous set-valued maps
- Renorming Banach spaces with many projections and smoothness properties
- Espaces de Banachs faiblement K-analytiques
- On certain classes of Markushevich bases
- The structure of weakly compact sets in Banach spaces
- On Banach Spaces with Strongly Separable Types
- The dual of every Asplund space admits a projectional resolution of the identity
- Equivalent norms on separable Asplund spaces
- SECOND-ORDER GÂTEAUX DIFFERENTIABILITY AND AN ISOMORPHIC CHARACTERIZATION OF HILBERT SPACES
- Markuševič Bases and Corson Compacta in Duality
- Trees in Renorming Theory
- Every Radon-Nikodym Corson compact space is Eberlein compact
