Quasi-uniform convergence topologies on function spaces- Revisited

Let X and Y be topological space and F(X,Y) the set of all functions from X into Y. We study various quasi-uniform convergence topologies U_{A} (A⊆P(X)) on F(X,Y) and their comparison in the setting of Y a quasi-uniform space. Further, we study U_{A}-closedness and right K-completeness properties of...

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Veröffentlicht in:	Applied general topology 2017-01, Vol.18 (2), p.301-316
Hauptverfasser:	Alqurash, Wafa Khalaf, Khan, Liaqat Ali
Format:	Artikel
Sprache:	eng
Schlagworte:	Quasi-uniform space, topology of quasi-uniform convergence on a family of sets, locally uniform spaces, right K-completeness, quasi-continuous functions, somewhat continuous functions
Online-Zugang:	Volltext
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Beschreibung
Zusammenfassung:	Let X and Y be topological space and F(X,Y) the set of all functions from X into Y. We study various quasi-uniform convergence topologies U_{A} (A⊆P(X)) on F(X,Y) and their comparison in the setting of Y a quasi-uniform space. Further, we study U_{A}-closedness and right K-completeness properties of certain subspaces of generalized continuous functions in F(X,Y) in the case of Y a locally symmetric quasi-uniform space or a locally uniform space.
ISSN:	1576-9402 1989-4147
DOI:	10.4995/agt.2017.7048