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Equivalence of the properties ( $β$ ) and (NUC) in Orlicz spaces

Sompong Dhompongsa (2000)

Commentationes Mathematicae Universitatis Carolinae

We obtain the equivalence of the properties $(β)$ and (NUC) in Orlicz function spaces. This answers a question raised by Y. Cui, R. Pluciennik and T. Wang.

Equivalences involving (p,q)-multi-norms

Oscar Blasco, H. G. Dales, Hung Le Pham (2014)

Studia Mathematica

We consider (p,q)-multi-norms and standard t-multi-norms based on Banach spaces of the form $L^{r} (Ω)$ , and resolve some question about the mutual equivalence of two such multi-norms. We introduce a new multi-norm, called the [p,q]-concave multi-norm, and relate it to the standard t-multi-norm.

Equivalent norms on separable Asplund spaces

C. Finet, W. Schachermayer (1989)

Studia Mathematica

Equivanishing sequences of mappings

Piotr Antosik (2000)

Banach Center Publications

Utilizing elementary properties of convergence of numerical sequences we prove Nikodym, Banach, Orlicz-Pettis type theorems

Equivariant sheaf cohomology.

Andreas Stieglitz (1978/1979)

Manuscripta mathematica

Ergodic theorems for contractions in Orlicz-Kantorovich lattices.

Zakirov, A.S., Chilin, V.I. (2009)

Sibirskij Matematicheskij Zhurnal

Errata on: “Banach-Saks properties of $C^{}$ -algebras and Hilbert $C^{}$ -modules”.

Frank, Michael, Pavlov, Alexander A. (2011)

Banach Journal of Mathematical Analysis [electronic only]

Errata to the article "On holomorphy in Banach spaces and absolute convergence of Fourier series" (Port. Math., 45(4) (1988), 429-450)

Matos, Mário C. (1990)

Portugaliae mathematica

Errata to the paper "Banach-Saks property in some Banach sequence spaces" (Ann. Polon. Math. 65 (1997), 193-202)

Yunan Cui, Henryk Hudzik, Ryszard Płuciennik (1997)

Annales Polonici Mathematici

Erratum to "Algebraic and topological properties of some sets in ℓ₁" (Colloq. Math. 129 (2012), 75-85)

Taras Banakh, Artur Bartoszewicz, Szymon Głąb, Emilia Szymonik (2014)

Colloquium Mathematicae

Erratum to “Can $ℬ (ℓ^{p})$ ever be amenable?” (Studia Math. 188 (2008), 151-174)

Matthew Daws, Volker Runde (2009)

Studia Mathematica

Erratum to "On the Facial Structure of the Unit Ball of a GM-Space", Math. Z. 193, 597-611 (1986).

C.M. Edwards, G.T. Rüttimann (1987)

Mathematische Zeitschrift

Erratum to the Paper: A Uniform Boundedness Principle for Compact Sets and the Decay of Fourier Transforms.

Colin C. Graham (1988)

Mathematische Zeitschrift

Erratum to the paper: Ideals of homogeneous polynomials and weakly compact approximation property in Banach spaces published in Czech. Math. J. vol. 57 (132), No. 2 (2007), 763–776

Erhan Çalışkan (2010)

Czechoslovak Mathematical Journal

Erratum to the paper "Smooth points of Musielak-Orlicz sequence spaces equipped with the Luxemburg norm" (Colloq. Math. 65 (1993), 157-164)

Henryk Hudzik, Zenon Zbąszyniak (1993)

Colloquium Mathematicae

Espaces associés à une suite bornée dans un espace de Banach (suite)

A. Brunel (1973/1974)

Séminaire Analyse fonctionnelle (dit "Maurey-Schwartz")

Espaces associés à une suite bornée dans un espace de Banach

A. Brunel (1973/1974)

Séminaire Analyse fonctionnelle (dit "Maurey-Schwartz")

Espaces associés à une suite bornée dans un espace de Banach (suite et fin)

A. Brunel (1973/1974)

Séminaire Analyse fonctionnelle (dit "Maurey-Schwartz")

Espaces de Banach contenant $l^{1}$ , d’après H. P. Rosenthal

J. Farahat (1973/1974)

Séminaire Analyse fonctionnelle (dit "Maurey-Schwartz")

Espaces de Banach : existence et unicité de certains préduaux

Gilles Godefroy (1978)

Annales de l'institut Fourier

On étudie dans ce travail le problème suivant : un espace de Banach $E$ étant donné, existe-t-il un Banach $X$ tel que $X^{'}$ soit isométrique à $E$ ? On donne un critère d’existence d’un tel espace $X$ pour un type particulier d’espaces $E$ . On montre ensuite qu’un tel espace $X$ est unique à isométries près pour quelques classes d’espaces $E$ . On en déduit alors quelques résultats sur les isométries de certains espaces de Banach et la géométrie de certains convexes compacts.

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