AbstractAn approach to the theory of subparacompactness is presented here. This approach allows one to understand the notions of subexpandability and to generalize a theorem from [6]. We also give an answer to a question from [5]
AbstractThe thrust of the paper is toward answering “What conditions on X and Y are sufficient to in...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
AbstractFor paracompact nearness spaces, we prove a generalization of the classical theorem of Micha...
AbstractAn approach to the theory of subparacompactness is presented here. This approach allows one ...
AbstractFollowing Pareek a topological space X is called D-paracompact if for every open cover A of ...
In this paper we continue the study of superparacompact and weakly superparacompact spaces. Several ...
AbstractIn the present paper, the four covering properties of topological spaces are paracompactness...
A space X is said to be suboaracompact if every open cover of X has a σ-discrete closed refinement, ...
AbstractWe identify some remnants of normality and call them rudimentary normality, generalize the c...
In this paper, we give a characterization of perfectly subparacompact spaces and we use this charact...
AbstractWe give an internal characterization of submetacompactness and then we use it to prove that ...
In this paper, we give a characterization of perfectly subparacompact spaces and we use this charact...
AbstractA topological space is said to be totally paracompact if every open base of it has a locally...
AbstractWe prove that (i) a collectionwise normal, orthocompact, θm-refinable, [m,ℵ0]-submetacompact...
AbstractWe prove that a locally connected, rim-Lindelöf, submeta Lindelöf, normal, ⩽ω2-collectionwis...
AbstractThe thrust of the paper is toward answering “What conditions on X and Y are sufficient to in...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
AbstractFor paracompact nearness spaces, we prove a generalization of the classical theorem of Micha...
AbstractAn approach to the theory of subparacompactness is presented here. This approach allows one ...
AbstractFollowing Pareek a topological space X is called D-paracompact if for every open cover A of ...
In this paper we continue the study of superparacompact and weakly superparacompact spaces. Several ...
AbstractIn the present paper, the four covering properties of topological spaces are paracompactness...
A space X is said to be suboaracompact if every open cover of X has a σ-discrete closed refinement, ...
AbstractWe identify some remnants of normality and call them rudimentary normality, generalize the c...
In this paper, we give a characterization of perfectly subparacompact spaces and we use this charact...
AbstractWe give an internal characterization of submetacompactness and then we use it to prove that ...
In this paper, we give a characterization of perfectly subparacompact spaces and we use this charact...
AbstractA topological space is said to be totally paracompact if every open base of it has a locally...
AbstractWe prove that (i) a collectionwise normal, orthocompact, θm-refinable, [m,ℵ0]-submetacompact...
AbstractWe prove that a locally connected, rim-Lindelöf, submeta Lindelöf, normal, ⩽ω2-collectionwis...
AbstractThe thrust of the paper is toward answering “What conditions on X and Y are sufficient to in...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
AbstractFor paracompact nearness spaces, we prove a generalization of the classical theorem of Micha...
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