Weak compact generating in duality

Kamil John; Václav Zizler

Displaying similar documents to “Weak compact generating in duality”

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Projections in dual weakly compactly generated Banach spaces

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Some remarks on non-separable Banach spaces with Markuševič basis

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The dual of every Asplund space admits a projectional resolution of the identity

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On strong M-bases in Banach spaces with PRI.

Deba P. Sinha (2000)

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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

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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.