AbstractWe construct two examples the first of which is a Lindelöf, separable and strongly zero- dimensional space the increment of which in any compactification is collectionwise normal, countably paracompact and infinite dimensional. The second example is a Lindelöf, separable, non-semicompact space that has a compactification with discrete increment
Abstract. A space X is truly weakly pseudocompact if X is either weakly pseu-docompact or Lindelöf ...
summary:A.V. Arkhangel'skii asked that, is it true that every space $Y$ of countable tightness is ho...
AbstractWe investigate paracompactness in the product of a paracompact space Y with a paracompact li...
AbstractWe construct two examples the first of which is a Lindelöf, separable and strongly zero- dim...
AbstractWe give an example of a perfectly normal first countable space X∗ with ind X∗ = 1 such that ...
AbstractLet l,m,n be integers such that 0⩽l⩽n and 0<m⩽n. We show that there is a first countable, se...
2000 Mathematics Subject Classification: 54C60, 54C65, 54D20, 54D30.In the present paper the Lindelö...
AbstractWe construct a pseudocompact meta-Lindelöf space which is not compact. This contrasts with t...
AbstractWe construct two non-submetrizable spaces of countable extent that have a Gδ-diagonal. Both ...
summary:Let $X$ be a compact Hausdorff space with a point $x$ such that $X\setminus \{ x\}$ is linea...
AbstractWe prove that a locally connected, rim-Lindelöf, submeta Lindelöf, normal, ⩽ω2-collectionwis...
AbstractThe property measure-compact fits between the Lindelöf and realcompact properties, i.e., Lin...
We study spaces X which have a countable outer base in βX; they are called ultracomplete in the most...
AbstractX has not a realcompact image if X is not Lindelöf and at least one of the following: X has ...
AbstractThe reduced measure algebra is used to construct, under CH, a hereditarily Lindelöf separabl...
Abstract. A space X is truly weakly pseudocompact if X is either weakly pseu-docompact or Lindelöf ...
summary:A.V. Arkhangel'skii asked that, is it true that every space $Y$ of countable tightness is ho...
AbstractWe investigate paracompactness in the product of a paracompact space Y with a paracompact li...
AbstractWe construct two examples the first of which is a Lindelöf, separable and strongly zero- dim...
AbstractWe give an example of a perfectly normal first countable space X∗ with ind X∗ = 1 such that ...
AbstractLet l,m,n be integers such that 0⩽l⩽n and 0<m⩽n. We show that there is a first countable, se...
2000 Mathematics Subject Classification: 54C60, 54C65, 54D20, 54D30.In the present paper the Lindelö...
AbstractWe construct a pseudocompact meta-Lindelöf space which is not compact. This contrasts with t...
AbstractWe construct two non-submetrizable spaces of countable extent that have a Gδ-diagonal. Both ...
summary:Let $X$ be a compact Hausdorff space with a point $x$ such that $X\setminus \{ x\}$ is linea...
AbstractWe prove that a locally connected, rim-Lindelöf, submeta Lindelöf, normal, ⩽ω2-collectionwis...
AbstractThe property measure-compact fits between the Lindelöf and realcompact properties, i.e., Lin...
We study spaces X which have a countable outer base in βX; they are called ultracomplete in the most...
AbstractX has not a realcompact image if X is not Lindelöf and at least one of the following: X has ...
AbstractThe reduced measure algebra is used to construct, under CH, a hereditarily Lindelöf separabl...
Abstract. A space X is truly weakly pseudocompact if X is either weakly pseu-docompact or Lindelöf ...
summary:A.V. Arkhangel'skii asked that, is it true that every space $Y$ of countable tightness is ho...
AbstractWe investigate paracompactness in the product of a paracompact space Y with a paracompact li...
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