Closed bounded sets in inductive limits of $\mathcal {K}$-spaces

Carlos Bosch; Jan Kučera

Displaying similar documents to “Closed bounded sets in inductive limits of $𝒦$ -spaces”

Regular inductive limits of K-spaces.

Thomas E. Gilsdorf (1991)

Collectanea Mathematica

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A well-known result for bounded sets in inductive limits of locally convex spaces is the following: If each of the constituent spaces En are Fréchet spaces and E is the inductive limit of the spaces En, then each bounded subset of E is bounded in some En iff E is locally complete. Using DeWilde's localization theorem, we show here that the completeness of each En and the local completeness of E may be replaced with the conditions that the spaces En are all webbed K-spaces and E is locally...

A class of locally convex spaces without $𝒞$ -webs

Manuel Valdivia (1982)

Annales de l'institut Fourier

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In this article we give some properties of the tensor product, with the $ϵ$ and $π$ topologies, of two locally convex spaces. As a consequence we prove that the theory of M. de Wilde of the closed graph theorem does not contain the closed graph theorem of L. Schwartz.

Baire-like spaces C(X,E)

Jerzy Kakol (2000)

Revista Matemática Complutense

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We characterize Baire-like spaces C(X,E) of continuous functions defined on a locally compact and Hewitt space X into a locally convex space E endowed with the compact-open topology.

Unordered Baire-like spaces without local convexity.

Jerzy Kakol, Walter Roelcke (1992)

Collectanea Mathematica

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The aim of the present paper is to study the class of tvs which we define by ommiting the word increasing in the definition of *-suprabarrelled spaces. We prove that the product of Baire tvs is *-UBL and hence the class of *-UBL spaces is stricty larger than the class of Baire spaces.

Remarks on bounded sets in ${(L F)}_{t v}$ -spaces

Jerzy Kąkol (1995)

Commentationes Mathematicae Universitatis Carolinae

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We establish the relationship between regularity of a Hausdorff ${(L B)}_{t v}$ -space and its properties like (K), M.c.c., sequential completeness, local completeness. We give a sufficient and necessary condition for a Hausdorff ${(L B)}_{t v}$ -space to be an ${(L S)}_{t v}$ -space. A factorization theorem for ${(L N)}_{t v}$ -spaces with property (K) is also obtained.

Displaying similar documents to “Closed bounded sets in inductive limits of 𝒦 -spaces”

Regular inductive limits of K-spaces.

A class of locally convex spaces without 𝒞 -webs

Baire-like spaces C(X,E)

Unordered Baire-like spaces without local convexity.

Remarks on bounded sets in ( L F ) t v -spaces

Displaying similar documents to “Closed bounded sets in inductive limits of $𝒦$ -spaces”

A class of locally convex spaces without $𝒞$ -webs

Remarks on bounded sets in ${(L F)}_{t v}$ -spaces