From a real-valued function , unbounded on a totally bounded subset of a metric space, we construct a Cauchy sequence in on which is unbounded. Taking to be a reciprocal Lebesgue number function, for an open cover of , gives a rapid proof that is compact when it is complete, without recourse to sequential compactness or the Lebesgue covering lemma. Finally, we apply the same reasoning to another function to give sequential compactness.Keywords: Pseudometric space, Cauchy sequence, total boundedness, Lebesgue number, Lebesgue covering lemma
We prove some basic properties of p-bounded subsets (p epsilon omega) in terms of z-ultrafilters and...
We establish a covering criterion involving a neighbourhood system and ideals of open sets which yie...
A metric space is Totally Bounded (also called preCompact) if it has a finite ε-net for every ε > 0 ...
If (X,d) is a pseudometric space, a cover ~ = (G) I a aE is said to be Lebesgue if there exists a r...
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...
We study totally bounded sets in variable Lebesgue spaces. The full characterization of this kind of...
summary:We introduce a general notion of covering property, of which many classical definitions are ...
AbstractAn approximation theorem for an upper semicontinuous mapping F from an arbitrary (not necess...
summary:We characterize those uniform spaces and commutative topological groups the bounded subsets ...
Converses are proved for the Osgood (the Principle of Uniform Boundedness), Dini, and other well kno...
paper. For simplicity we follow the rules: M is a metric space, c, g are elements of the carrier of ...
Let T be a locally compact Hausdorff topological space and let o(SBo) denote the CT-ring of all Bair...
In this paper the nonstandard theory of uniform topological spaces isapplied with two main objective...
A subset A of X is bounded if every continuous real-valued function on X is bounded on A. A comple...
Summary.- In this paper we present, in a unied way, several re-sults of uniform approximation for re...
We prove some basic properties of p-bounded subsets (p epsilon omega) in terms of z-ultrafilters and...
We establish a covering criterion involving a neighbourhood system and ideals of open sets which yie...
A metric space is Totally Bounded (also called preCompact) if it has a finite ε-net for every ε > 0 ...
If (X,d) is a pseudometric space, a cover ~ = (G) I a aE is said to be Lebesgue if there exists a r...
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...
We study totally bounded sets in variable Lebesgue spaces. The full characterization of this kind of...
summary:We introduce a general notion of covering property, of which many classical definitions are ...
AbstractAn approximation theorem for an upper semicontinuous mapping F from an arbitrary (not necess...
summary:We characterize those uniform spaces and commutative topological groups the bounded subsets ...
Converses are proved for the Osgood (the Principle of Uniform Boundedness), Dini, and other well kno...
paper. For simplicity we follow the rules: M is a metric space, c, g are elements of the carrier of ...
Let T be a locally compact Hausdorff topological space and let o(SBo) denote the CT-ring of all Bair...
In this paper the nonstandard theory of uniform topological spaces isapplied with two main objective...
A subset A of X is bounded if every continuous real-valued function on X is bounded on A. A comple...
Summary.- In this paper we present, in a unied way, several re-sults of uniform approximation for re...
We prove some basic properties of p-bounded subsets (p epsilon omega) in terms of z-ultrafilters and...
We establish a covering criterion involving a neighbourhood system and ideals of open sets which yie...
A metric space is Totally Bounded (also called preCompact) if it has a finite ε-net for every ε > 0 ...