AbstractA completely regular Hausdorff space X is called retractive if there is a retraction from βX onto βX\X. A product space is retractive if and only if all factors are compact but one which is retractive
AbstractWe obtain a characterization of all those topological properties of regular Hausdorff spaces...
Let X be a compact metric space and let Y be a non-compact, locally compact metric space. In this pa...
AbstractConditions under which a product space will be regular-closed or minimal regular are studied...
AbstractA completely regular Hausdorff space X is called retractive if there is a retraction from βX...
AbstractWithin the class of Tychonoff spaces, and within the class of topological groups, most of th...
AbstractA theorem due to Comfort and Ross asserts that the product of any family of pseudocompact to...
AbstractIf there is a retraction from βX onto βX-X then X is locally compact and pseudocompact. (But...
AbstractWe prove a Dichotomy Theorem: for any Hausdorff compactification bG of an arbitrary rectifia...
summary:Arhangel'ski\v{\i} proved that if $X$ and $Y$ are completely regular spaces such that ${C_p ...
AbstractWe obtain some results on product spaces. Among them we prove that for noncompact spaces X1 ...
AbstractWe investigate C-compact and relatively pseudocompact subsets of Tychonoff spaces with a spe...
AbstractA space X is said to be completely Hausdorff if C(X), the set of bounded continuous real val...
summary:For a cardinal $\alpha $, we say that a subset $B$ of a space $X$ is $C_{\alpha }$-compact i...
AbstractWe generalize and refine results from the author's paper [18]. For a completely regular Haus...
AbstractA compactification αX of a locally compact Hausdorff space X is said to be singular if αX β ...
AbstractWe obtain a characterization of all those topological properties of regular Hausdorff spaces...
Let X be a compact metric space and let Y be a non-compact, locally compact metric space. In this pa...
AbstractConditions under which a product space will be regular-closed or minimal regular are studied...
AbstractA completely regular Hausdorff space X is called retractive if there is a retraction from βX...
AbstractWithin the class of Tychonoff spaces, and within the class of topological groups, most of th...
AbstractA theorem due to Comfort and Ross asserts that the product of any family of pseudocompact to...
AbstractIf there is a retraction from βX onto βX-X then X is locally compact and pseudocompact. (But...
AbstractWe prove a Dichotomy Theorem: for any Hausdorff compactification bG of an arbitrary rectifia...
summary:Arhangel'ski\v{\i} proved that if $X$ and $Y$ are completely regular spaces such that ${C_p ...
AbstractWe obtain some results on product spaces. Among them we prove that for noncompact spaces X1 ...
AbstractWe investigate C-compact and relatively pseudocompact subsets of Tychonoff spaces with a spe...
AbstractA space X is said to be completely Hausdorff if C(X), the set of bounded continuous real val...
summary:For a cardinal $\alpha $, we say that a subset $B$ of a space $X$ is $C_{\alpha }$-compact i...
AbstractWe generalize and refine results from the author's paper [18]. For a completely regular Haus...
AbstractA compactification αX of a locally compact Hausdorff space X is said to be singular if αX β ...
AbstractWe obtain a characterization of all those topological properties of regular Hausdorff spaces...
Let X be a compact metric space and let Y be a non-compact, locally compact metric space. In this pa...
AbstractConditions under which a product space will be regular-closed or minimal regular are studied...
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