If (X,d) is a pseudometric space, a cover ~ = (G) I a aE is said to be Lebesgue if there exists a real number 0> 0 such that for all x in X, B(x,o) C G for some a E I. (O
Gleason [G] introduced in 1958 the notion of projective cover for compact Hausdorff spaces. Later, P...
AbstractA topological space is said to be totally paracompact if every open base of it has a locally...
summary:We characterize those uniform spaces and commutative topological groups the bounded subsets ...
If (X,d) is a pseudometric space, a cover ~ = (G) I a aE is said to be Lebesgue if there exists a r...
This paper will be devoted to an exposition of some of the basic properties of paracompact spaces. I...
From a real-valued function , unbounded on a totally bounded subset of a metric space, we construct...
AbstractWe prove that (i) a collectionwise normal, orthocompact, θm-refinable, [m,ℵ0]-submetacompact...
All spaces are assumed to be T1-spaces. In patricular, paracompact spaces are assumed to be Tz. The ...
AbstractIt is shown that a regular space is collectionwise normal and countably paracompact if every...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
L~t (X,d) be a metric space. A Lebesgue number for an open cover lj of X is an E> 0 such that for...
AbstractFollowing Pareek a topological space X is called D-paracompact if for every open cover A of ...
Recently two new types of completeness in metric spaces, called Bourbaki-completeness and cofinal Bo...
AbstractIn this paper it is proved that a topological space is necessarily paracompact if it is mono...
It is well known that every countably compact, meta compact (T-) space is compact, and it is easy to...
Gleason [G] introduced in 1958 the notion of projective cover for compact Hausdorff spaces. Later, P...
AbstractA topological space is said to be totally paracompact if every open base of it has a locally...
summary:We characterize those uniform spaces and commutative topological groups the bounded subsets ...
If (X,d) is a pseudometric space, a cover ~ = (G) I a aE is said to be Lebesgue if there exists a r...
This paper will be devoted to an exposition of some of the basic properties of paracompact spaces. I...
From a real-valued function , unbounded on a totally bounded subset of a metric space, we construct...
AbstractWe prove that (i) a collectionwise normal, orthocompact, θm-refinable, [m,ℵ0]-submetacompact...
All spaces are assumed to be T1-spaces. In patricular, paracompact spaces are assumed to be Tz. The ...
AbstractIt is shown that a regular space is collectionwise normal and countably paracompact if every...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
L~t (X,d) be a metric space. A Lebesgue number for an open cover lj of X is an E> 0 such that for...
AbstractFollowing Pareek a topological space X is called D-paracompact if for every open cover A of ...
Recently two new types of completeness in metric spaces, called Bourbaki-completeness and cofinal Bo...
AbstractIn this paper it is proved that a topological space is necessarily paracompact if it is mono...
It is well known that every countably compact, meta compact (T-) space is compact, and it is easy to...
Gleason [G] introduced in 1958 the notion of projective cover for compact Hausdorff spaces. Later, P...
AbstractA topological space is said to be totally paracompact if every open base of it has a locally...
summary:We characterize those uniform spaces and commutative topological groups the bounded subsets ...