On the Structure of Weakly Compact Subsets of Hilbert Spaces and Applications to the Geometry of Banach Spaces
DOI10.2307/1999709zbMath0585.46010OpenAlexW4251394360MaRDI QIDQ3711013
Spiros A. Argyros, Vassiliki Farmaki
Publication date: 1985
Full work available at URL: https://doi.org/10.2307/1999709
factorization of operatorsB-spaces with an unconditional basischaracterization of weakly compact subsets of a Hilbert spacenorm uniformly convex in every directionrenorm a class of reflexive b-spacesstructure of weakly compact subsets of \(L^ 1(\mu )\)
Geometry and structure of normed linear spaces (46B20) Factorization theory (including Wiener-Hopf and spectral factorizations) of linear operators (47A68) Duality and reflexivity in normed linear and Banach spaces (46B10) Inner product spaces and their generalizations, Hilbert spaces (46C99) Compactness in topological linear spaces; angelic spaces, etc. (46A50)
Related Items
Cites Work
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- Factoring weakly compact operators
- On Banach lattices and spaces having local unconditional structure, with applications to Lorentz function spaces
- Geometry of Banach spaces. Selected topics
- Embedding weakly compact sets into Hilbert space
- Continuous images of weakly compact subsets of Banach spaces
- The structure of weakly compact sets in Banach spaces
- Classical Banach spaces
- On Nonseparable Banach Spaces
- Reflexive Banach spaces without equivalent norms which are uniformly convex or uniformly differentiable in every direction
- On locally uniformly convex and differentiable norms in certain non-separable Banach spaces
- Normed Linear Spaces that are Uniformly Convex in Every Direction
- Weak Compactness in Banach Spaces
- Super-reflexive spaces with bases
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