We characterize the separation properties T0 and T1 at a point p in the category of quasi-proximity spaces. Moreover, the (strongly) closed and (strongly) open subobjects of an object, and each of the various notions of connected and compact objects are characterized in this topological category.</div
AbstractThis paper offers solutions for two problems which have attracted many topologists over the ...
In this paper, the characterization of closed and strongly closed subobjects of an object in categor...
In previous papers, various notions of (strongly) closed subobject, (strongly) open subobject, conne...
We characterize the separation properties T0 and T1 at a point p in the category of quasi-proximity ...
In this paper, an explicit characterization of the separation properties T-0 and T-1 at a point p is...
In previous papers, various notions of (strongly) closed subobject, (strongly) open subobject, conne...
summary:In previous papers, various notions of pre-Hausdorff, Hausdorff and regular objects at a poi...
In previous papers, various notions of pre-Hausdorff, Hausdorff and regularobjects at a point p in a...
In this paper, an explicit characterization of the separation properties for T-0, T-1, PreT(2) (pre-...
In [2] and [7], Baran defined various generalization of the separation properties T-3 and T-4 for to...
Generally speaking, topology is a closeness between points and sets, promixity is a closeness betwee...
summary:In [1], various generalizations of the separation properties, the notion of closed and stron...
We introduce the notion of a topological quasi-apartness space and the notion of a uniform quasi-apa...
Abstract. We will define the fuzzy quasi-proximity space and investigate some properties of fuzzy qu...
Abstract. We will continue the study of p-closed spaces. This class of spaces is strictly placed bet...
AbstractThis paper offers solutions for two problems which have attracted many topologists over the ...
In this paper, the characterization of closed and strongly closed subobjects of an object in categor...
In previous papers, various notions of (strongly) closed subobject, (strongly) open subobject, conne...
We characterize the separation properties T0 and T1 at a point p in the category of quasi-proximity ...
In this paper, an explicit characterization of the separation properties T-0 and T-1 at a point p is...
In previous papers, various notions of (strongly) closed subobject, (strongly) open subobject, conne...
summary:In previous papers, various notions of pre-Hausdorff, Hausdorff and regular objects at a poi...
In previous papers, various notions of pre-Hausdorff, Hausdorff and regularobjects at a point p in a...
In this paper, an explicit characterization of the separation properties for T-0, T-1, PreT(2) (pre-...
In [2] and [7], Baran defined various generalization of the separation properties T-3 and T-4 for to...
Generally speaking, topology is a closeness between points and sets, promixity is a closeness betwee...
summary:In [1], various generalizations of the separation properties, the notion of closed and stron...
We introduce the notion of a topological quasi-apartness space and the notion of a uniform quasi-apa...
Abstract. We will define the fuzzy quasi-proximity space and investigate some properties of fuzzy qu...
Abstract. We will continue the study of p-closed spaces. This class of spaces is strictly placed bet...
AbstractThis paper offers solutions for two problems which have attracted many topologists over the ...
In this paper, the characterization of closed and strongly closed subobjects of an object in categor...
In previous papers, various notions of (strongly) closed subobject, (strongly) open subobject, conne...
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