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Baire-like spaces C(X,E)

Jerzy Kakol — 2000

Revista Matemática Complutense

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.

The Mackey-Arens theorem for non-locally convex spaces.

Jerzy Kakol — 1990

Collectanea Mathematica

Let R be a subcategory of the category of all topological vector spaces. Let E be an element of R. The problem of the existence of the finest R-topology on E with the same continuous linear functionals as the original one is discussed. Remarks concerning the Hahn-Banach Extension Property are included.

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 × F contains a dense dual-separating subspace if either E or F has this property.

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

Jerzy Kąkol — 1995

Commentationes Mathematicae Universitatis Carolinae

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.

Unordered Baire-like spaces without local convexity.

Jerzy KakolWalter Roelcke — 1992

Collectanea Mathematica

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.

A note on Fréchet-Urysohn locally convex spaces.

Jerzy KąkolManuel López Pellicer — 2007

RACSAM

Recently Cascales, Kąkol and Saxon showed that in a large class of locally convex spaces (so called class G) every Fréchet-Urysohn space is metrizable. Since there exist (under Martin’s axiom) nonmetrizable separable Fréchet-Urysohn spaces C(X) and only metrizable spaces C(X) belong to class G, we study another sufficient conditions for Fréchet-Urysohn locally convex spaces to be metrizable.

On topological groups with a small base and metrizability

Saak GabriyelyanJerzy KąkolArkady Leiderman — 2015

Fundamenta Mathematicae

A (Hausdorff) topological group is said to have a -base if it admits a base of neighbourhoods of the unit, U α : α , such that U α U β whenever β ≤ α for all α , β . The class of all metrizable topological groups is a proper subclass of the class T G of all topological groups having a -base. We prove that a topological group is metrizable iff it is Fréchet-Urysohn and has a -base. We also show that any precompact set in a topological group G T G is metrizable, and hence G is strictly angelic. We deduce from this result...

A non-archimedean Dugundji extension theorem

Jerzy KąkolAlbert KubzdelaWiesƚaw Śliwa — 2013

Czechoslovak Mathematical Journal

We prove a non-archimedean Dugundji extension theorem for the spaces C * ( X , 𝕂 ) of continuous bounded functions on an ultranormal space X with values in a non-archimedean non-trivially valued complete field 𝕂 . Assuming that 𝕂 is discretely valued and Y is a closed subspace of X we show that there exists an isometric linear extender T : C * ( Y , 𝕂 ) C * ( X , 𝕂 ) if X is collectionwise normal or Y is Lindelöf or 𝕂 is separable. We provide also a self contained proof of the known fact that any metrizable compact subspace Y of an ultraregular...

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