On one generalization of weakly compactly generated Banach spaces
L. Vašák (1981)
Studia Mathematica
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Displaying similar documents to “Weak compact generating in duality”
On one generalization of weakly compactly generated Banach spaces
Projections in dual weakly compactly generated Banach spaces
K. John, V. Zizler (1973)
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Some remarks on non-separable Banach spaces with Markuševič basis
Kamil John, Václav Zizler (1974)
Commentationes Mathematicae Universitatis Carolinae
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On the existence of fundamental and total founded biorthogonal systems in Banach spaces
W. Davis, W. Johnson (1973)
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The dual of every Asplund space admits a projectional resolution of the identity
Marián Fabian, Gilles Godefroy (1988)
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On strong M-bases in Banach spaces with PRI.
Deba P. Sinha (2000)
Collectanea Mathematica
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If every member of a class P of Banach spaces has a projectional resolution of the identity such that certain subspaces arising out of this resolution are also in the class P, then it is proved that every Banach space in P has a strong M-basis. Consequently, every weakly countably determined space, the dual of every Asplund space, every Banach space with an M-basis such that the dual unit ball is weak* angelic and every C(K) space for a Valdivia compact set K , has a strong M-basis. ...
Isomorphic properties of Banach spaces of continuous functions
Z. Semadeni (1963)
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On Kadec-Klee norms on Banach spaces
Dick van Dulst, Ivan Singer (1976)
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Complemented and uncomplemented subspaces of Banach spaces.
Anatolij M. Plichko, David Yost (2000)
Extracta Mathematicae
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Does a given Banach space have any non-trivial complemented subspaces? Usually, the answer is: yes, quite a lot. Sometimes the answer is: no, none at all.