EUDML

Let $x_{0}$ be a q-point of a regular space $X, Y$ a Hausdorff space whose relatively countably compact subsets are relatively compact and let $F : X \to Y$ be an upper semicontinuous set valued map. Then the active boundary $Frac F (x_{0})$ is the smallest compact kernel of $F$ at $x_{0}$ .

Extensions of Integral Operators.

Pawel Szeptycki; Iwo Labuda — 1988

Mathematische Annalen

On Subseries Convergent Series and m-Quasi-Bases in Topological Linear Spaces.

Iwo Labuda; Zbigniew Lipecki — 1982

Manuscripta mathematica

Domains of integral operators

Iwo Labuda; Paweł Szeptycki — 1994

Studia Mathematica

It is shown that the proper domains of integral operators have separating duals but in general they are not locally convex. Banach function spaces which can occur as proper domains are characterized. Some known and some new results are given, illustrating the usefulness of the notion of proper domain.

Vector series whose lacunary subseries converge

Lech Drewnowski; Iwo Labuda — 2000

Studia Mathematica

The area of research of this paper goes back to a 1930 result of H. Auerbach showing that a scalar series is (absolutely) convergent if all its zero-density subseries converge. A series $\sum_{n} x_{n}$ in a topological vector space X is called ℒ-convergent if each of its lacunary subseries $\sum_{k} x_{n_{k}}$ (i.e. those with $n_{k + 1} - n_{k} \to \infty$ ) converges. The space X is said to have the Lacunary Convergence Property, or LCP, if every ℒ-convergent series in X is convergent; in fact, it is then subseries convergent. The Zero-Density Convergence...