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Displaying 1 – 17 of 17

A bipolar theorem for L $_{+}^{0} (Ω, ℱ, 𝐏)$

Werner Brannath, Walter Schachermayer (1999)

Séminaire de probabilités de Strasbourg

A density theorem for F-spaces

W. Żelazko (1990)

Studia Mathematica

A finite dimensional reduction of the Schauder Conjecture

Espedito De Pascale (1993)

Commentationes Mathematicae Universitatis Carolinae

Schauder’s Conjecture (i.eėvery compact convex set in a Hausdorff topological vector space has the f.p.p.) is reduced to the search for fixed points of suitable multivalued maps in finite dimensional spaces.

A Lifting Result for Locally Pseudo-Convex Subspaces of L₀

Félix Cabello Sánchez (2006)

Bulletin of the Polish Academy of Sciences. Mathematics

It is shown that if F is a topological vector space containing a complete, locally pseudo-convex subspace E such that F/E = L₀ then E is complemented in F and so F = E⊕ L₀. This generalizes results by Kalton and Peck and Faber.

A note on a theorem of Klee

Jerzy Kąkol (1993)

Commentationes Mathematicae Universitatis Carolinae

It is proved that if $E, F$ are separable quasi-Banach spaces, then $E \times F$ contains a dense dual-separating subspace if either $E$ or $F$ has this property.

A note on the barrelledness in linear topological spaces

S. Radenović (1987)

Matematički Vesnik

A remark on a Banach-Steinhaus theorem of Narang

Antosik, Piotr, Swartz, Charles (1990)

Portugaliae mathematica

A remark on a problem of Klee

N. Kalton, N. Peck (1996)

Colloquium Mathematicae

A restricted form of the theorem of Maurey-Pisier for the cotype in $p$ -Banach spaces

J. Bastero (1982)

Annales de l'I.H.P. Probabilités et statistiques

A rigid space admitting compact operators

Paul Sisson (1995)

Studia Mathematica

A rigid space is a topological vector space whose endomorphisms are all simply scalar multiples of the identity map. The first complete rigid space was published in 1981 in [2]. Clearly a rigid space is a trivial-dual space, and admits no compact endomorphisms. In this paper a modification of the original construction results in a rigid space which is, however, the domain space of a compact operator, answering a question that was first raised soon after the existence of complete rigid spaces was...

The Antosik-Mikusinski Matrix Theorem is used to give an extension of a uniform boundedness principle due to V. Pták to certain metric linear spaces. An application to bilinear operators is given.

Currently displaying 1 – 17 of 17

Page 1

Displaying 1 – 17 of 17

A bipolar theorem for L $_{+}^{0} (Ω, ℱ, 𝐏)$

A density theorem for F-spaces

A finite dimensional reduction of the Schauder Conjecture

A Lifting Result for Locally Pseudo-Convex Subspaces of L₀

A note on a theorem of Klee

A note on the barrelledness in linear topological spaces

A remark on a Banach-Steinhaus theorem of Narang

A remark on a problem of Klee

A restricted form of the theorem of Maurey-Pisier for the cotype in $p$ -Banach spaces

A rigid space admitting compact operators

A rigid topological vector space

A stochastic version of Fan's best approximation theorem.

A uniform boundedness principle of Pták

About the Banach envelope of l1,∞.

Algunos resultados sobre representabilidad finita de 1q (O < q ≤∞) en espacios p-Banach.

An example of J. W. Roberts of a convex compact subset in a linear metric space with no extreme points

Analytic functions in non-locally convex spaces and applications

Currently displaying 1 – 17 of 17