Add to ORKGAbstract. It is known that every finite power of ω1 is hereditarily collec-tionwise Hausdorff [6], [2]. And it is easy to see that there is a subspace of (ω + 1) × (ω1 + 1) which is not collectionwise Hausdorff. We will prove that every product space of two subspaces of ordinals is collectionwise Haus-dorff, but there is a product space of three subspaces of ordinals which is not collectionwise Hausdorff. 1
We show that, if an MCP (monotonically countably paracompact) space fails to be collectionwise Hausd...
AbstractUnder set theoretic hypotheses, we construct a λ-collectionwise Hausdorff not λ+- collection...
In this work, we introduce the concept of collectionwise Hausdorff bitopological spaces by using ope...
AbstractLet μ and ν be two ordinals. If X is a subspace of μ×ν, then X is dually scattered of rank⩽2...
AbstractWe show that the product of finitely many subspaces of ordinals is strongly zero-dimensional...
AbstractLet A and B be subspaces of the initial segment of an uncountable ordinal number κ with the ...
Abstract. Let X be a subspace of the product of finitely many ordinals. If X is normal, then X is st...
AbstractIt will be shown that μ × ν is hereditarily countably metacompact for any ordinals μ and ν. ...
AbstractIt is known that products of arbitrary many ordinals are mildly normal [L. Kalantan, P.J. Sz...
This is the published version, also available here: http://dx.doi.org/10.1090/S0002-9939-02-06751-5#...
AbstractIn this note, we show that if X is the union of a finite collection {Xi:i=1,…,k} of weak θ¯-...
This is the published version, also available here: http://dx.doi.org/10.1090/S0002-9939-02-06751-5#...
AbstractCollectionwise normal (CWN) and collectionwise Hausdorff (CWH) spaces have played an increas...
William Fleissner and Adrienne Stanley showed that, in finite products of ordinals, the following ar...
William Fleissner and Adrienne Stanley showed that, in finite products of ordinals, the following ar...
We show that, if an MCP (monotonically countably paracompact) space fails to be collectionwise Hausd...
AbstractUnder set theoretic hypotheses, we construct a λ-collectionwise Hausdorff not λ+- collection...
In this work, we introduce the concept of collectionwise Hausdorff bitopological spaces by using ope...
AbstractLet μ and ν be two ordinals. If X is a subspace of μ×ν, then X is dually scattered of rank⩽2...
AbstractWe show that the product of finitely many subspaces of ordinals is strongly zero-dimensional...
AbstractLet A and B be subspaces of the initial segment of an uncountable ordinal number κ with the ...
Abstract. Let X be a subspace of the product of finitely many ordinals. If X is normal, then X is st...
AbstractIt will be shown that μ × ν is hereditarily countably metacompact for any ordinals μ and ν. ...
AbstractIt is known that products of arbitrary many ordinals are mildly normal [L. Kalantan, P.J. Sz...
This is the published version, also available here: http://dx.doi.org/10.1090/S0002-9939-02-06751-5#...
AbstractIn this note, we show that if X is the union of a finite collection {Xi:i=1,…,k} of weak θ¯-...
This is the published version, also available here: http://dx.doi.org/10.1090/S0002-9939-02-06751-5#...
AbstractCollectionwise normal (CWN) and collectionwise Hausdorff (CWH) spaces have played an increas...
William Fleissner and Adrienne Stanley showed that, in finite products of ordinals, the following ar...
William Fleissner and Adrienne Stanley showed that, in finite products of ordinals, the following ar...
We show that, if an MCP (monotonically countably paracompact) space fails to be collectionwise Hausd...
AbstractUnder set theoretic hypotheses, we construct a λ-collectionwise Hausdorff not λ+- collection...
In this work, we introduce the concept of collectionwise Hausdorff bitopological spaces by using ope...