Add to ORKGExtensions of CS-regular maps from a dense subset of a metric space to the whole space are discussed in the literature. It is the purpose of this paper to present results on extensions of these maps to the bicompletion in separated quasipseudo metric spaces, and in addition we discuss extensions of maps that preserve some special property. Finally, an analogue of the Tietze extension theorem will be discussed in this context. Keywords: Bicompletion; Cauchy preserving maps; quasi-pseudo metric space; bounded sets; map extensions; quasi-uniform continuity; quasi-uniform continuity on bounded setsQuaestiones Mathematicae 28(2005), 391– 400
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
AbstractIn formal analogy to separable metric spaces we introduce the concept of a generated quasi-m...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...
In [6] characterizations of continuous maps between uniform spaces in terms of nets and filters are ...
In this paper, we characterize each of various forms of T0, T1, T2, and pre-Hausdorff extendedpseudo...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
AbstractWe present a conjugate invariant method for completing any T0-quasi-metric space. The comple...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
AbstractIn this article we introduce and investigate the concept of a partial quasi-metric and some ...
AbstractWe define a functor from topological quasi-uniform spaces and continuous, uniformly continuo...
We define a functor from topological quasi-uniform spaces and continuous, uniformly continuous maps...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
The preservation of various completeness properties in the quasi-metric (and quasi-uniform) setting ...
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
AbstractIn formal analogy to separable metric spaces we introduce the concept of a generated quasi-m...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...
In [6] characterizations of continuous maps between uniform spaces in terms of nets and filters are ...
In this paper, we characterize each of various forms of T0, T1, T2, and pre-Hausdorff extendedpseudo...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
AbstractWe present a conjugate invariant method for completing any T0-quasi-metric space. The comple...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
AbstractIn this article we introduce and investigate the concept of a partial quasi-metric and some ...
AbstractWe define a functor from topological quasi-uniform spaces and continuous, uniformly continuo...
We define a functor from topological quasi-uniform spaces and continuous, uniformly continuous maps...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
The preservation of various completeness properties in the quasi-metric (and quasi-uniform) setting ...
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
AbstractIn formal analogy to separable metric spaces we introduce the concept of a generated quasi-m...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...