We discuss completeness in terms of a notion of absolute closure. This will be done in the context of separated quasi-pseudometric spaces and bitopological spaces. The notion is equivalent to the classical notion of completeness when restricted to the class of metric spaces
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
The preservation of various completeness properties in the quasi-metric (and quasi-uniform) setting ...
AbstractWe define a notion of completion for quasi-uniform spaces in a categorical manner, and const...
It is well-known that a metric space $(X, d)$ is complete iff the set $X$ is closed in every metric ...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...
We present a notion of completeness and a completion for a quasi-pseudometric space. In this article...
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
[EN] Hu proved in [4] that a metric space (X, d) is complete if and only if for any closed subspace...
In the present paper, considering some different type of Cauchy sequence on a quasi metric space, we...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
AbstractA notion of Cauchy sequence in quasi-metric spaces is introduced and used to define a standa...
A~natural strengthening of the completeness hypothesis, called B-completeness, allows us to extend t...
A~natural strengthening of the completeness hypothesis, called B-completeness, allows us to extend t...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
The preservation of various completeness properties in the quasi-metric (and quasi-uniform) setting ...
AbstractWe define a notion of completion for quasi-uniform spaces in a categorical manner, and const...
It is well-known that a metric space $(X, d)$ is complete iff the set $X$ is closed in every metric ...
AbstractWe continue our study of the conjugate invariant method for completing an arbitrary T0-quasi...
We present a notion of completeness and a completion for a quasi-pseudometric space. In this article...
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
AbstractWe present a characterization of those quasi-pseudometrizable bitopological spaces which adm...
[EN] Hu proved in [4] that a metric space (X, d) is complete if and only if for any closed subspace...
In the present paper, considering some different type of Cauchy sequence on a quasi metric space, we...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
AbstractA notion of Cauchy sequence in quasi-metric spaces is introduced and used to define a standa...
A~natural strengthening of the completeness hypothesis, called B-completeness, allows us to extend t...
A~natural strengthening of the completeness hypothesis, called B-completeness, allows us to extend t...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
summary:We characterize the quasi-metric spaces which have a quasi-metric half-comp\-le\-tion and de...
The preservation of various completeness properties in the quasi-metric (and quasi-uniform) setting ...
AbstractWe define a notion of completion for quasi-uniform spaces in a categorical manner, and const...
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