Structure of the sets of weak solutions of an ordinary differential equation in a Banach space
Ireneusz Kubiaczyk (1984)
Annales Polonici Mathematici
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Displaying similar documents to “An interplay between the weak form of Peano's theorem and structural aspects of Banach spaces”
Structure of the sets of weak solutions of an ordinary differential equation in a Banach space
3-Weak amenability of (2n)th duals of Banach algebras
Mina Ettefagh (2012)
Colloquium Mathematicae
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We show that under some conditions, 3-weak amenability of the (2n)th dual of a Banach algebra A for some n ≥ 1 implies 3-weak amenability of A.
On a characterization of reflexive Banach spaces
Emilia Perri (1983)
Rendiconti del Seminario Matematico della Università di Padova
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An extension property for Banach spaces
Walden Freedman (2002)
Colloquium Mathematicae
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A Banach space X has property (E) if every operator from X into c₀ extends to an operator from X** into c₀; X has property (L) if whenever K ⊆ X is limited in X**, then K is limited in X; X has property (G) if whenever K ⊆ X is Grothendieck in X**, then K is Grothendieck in X. In all of these, we consider X as canonically embedded in X**. We study these properties in connection with other geometric properties, such as the Phillips properties, the Gelfand-Phillips and weak Gelfand-Phillips...
Deviation from weak Banach–Saks property for countable direct sums
Andrzej Kryczka (2015)
Annales UMCS, Mathematica
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We introduce a seminorm for bounded linear operators between Banach spaces that shows the deviation from the weak Banach-Saks property. We prove that if (Xν) is a sequence of Banach spaces and a Banach sequence lattice E has the Banach-Saks property, then the deviation from the weak Banach-Saks property of an operator of a certain class between direct sums E(Xν) is equal to the supremum of such deviations attained on the coordinates Xν. This is a quantitative version for operators of...
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.
On the Gelfand-Phillips property in Banach spaces with PRI.
D. P. Sinha, K. K. Arora (1997)
Collectanea Mathematica
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The weak Phillips property
Ali Ülger (2001)
Colloquium Mathematicae
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Let X be a Banach space. If the natural projection p:X*** → X* is sequentially weak*-weak continuous then the space X is said to have the weak Phillips property. We present several characterizations of the spaces having this property and study its relationships to other Banach space properties, especially the Grothendieck property.
Kneser's Theorem For Weak Solutions Of Ordinary Differential Equations In Banach Spaces
I. Kubiaczyk, S. Szufla (1982)
Publications de l'Institut Mathématique
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The Johnson-Lindenstrauss space.
David Yost (1997)
Extracta Mathematicae
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Rough and strongly rough norms on Banach spaces
Whitfield, J. H. M.
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