AbstractWe show that every regular T1 submeta-Lindelöf space of cardinality ω1 is D under MA+¬CH, which answers a question posed by Gruenhage (2011) [9]. Borges (1991) [5] asked if every monotonically normal paracompact space is a D-space, we give a characterization of paracompactness for monotonically normal spaces, which may be of some use in solving this problem
AbstractWe prove that if X is a paracompact monotonically normal space, and Y has a point-countable ...
AbstractTwo theorems are given analyzing the possible refinements of open covers of a monotonically ...
AbstractWe study the D-space property and its generalizations, the notions of an aD-space and a weak...
AbstractIn this note, we show that every monotonically (countably) metacompact space is hereditarily...
AbstractAssuming ⋄, we construct a T2 example of a hereditarily Lindelöf space of size ω1 which is n...
AbstractWe prove that a locally connected, rim-Lindelöf, submeta Lindelöf, normal, ⩽ω2-collectionwis...
AbstractWe introduce a generalization of D-spaces, which we call linearly D-spaces. The following re...
summary:We shall prove that under CH every regular meta-Lindelöf $P$-space which is locally $D$ has ...
summary:We shall prove that under CH every regular meta-Lindelöf $P$-space which is locally $D$ has ...
AbstractWe prove that if X is a paracompact monotonically normal space, and Y has a point-countable ...
AbstractIn this note, we show that a monotonically normal space that is monotonically countably meta...
AbstractFollowing Pareek a topological space X is called D-paracompact if for every open cover A of ...
AbstractA space X is Lindelöf-normal or L-normal if every Lindelöf closed subset of X has arbitraril...
AbstractWe proved that ⋄+ implies the existence of a non-D-space whose all closed subspace F satisfi...
AbstractWe use U-sticky sets to show that box products of scattered spaces of height 1 are D-spaces ...
AbstractWe prove that if X is a paracompact monotonically normal space, and Y has a point-countable ...
AbstractTwo theorems are given analyzing the possible refinements of open covers of a monotonically ...
AbstractWe study the D-space property and its generalizations, the notions of an aD-space and a weak...
AbstractIn this note, we show that every monotonically (countably) metacompact space is hereditarily...
AbstractAssuming ⋄, we construct a T2 example of a hereditarily Lindelöf space of size ω1 which is n...
AbstractWe prove that a locally connected, rim-Lindelöf, submeta Lindelöf, normal, ⩽ω2-collectionwis...
AbstractWe introduce a generalization of D-spaces, which we call linearly D-spaces. The following re...
summary:We shall prove that under CH every regular meta-Lindelöf $P$-space which is locally $D$ has ...
summary:We shall prove that under CH every regular meta-Lindelöf $P$-space which is locally $D$ has ...
AbstractWe prove that if X is a paracompact monotonically normal space, and Y has a point-countable ...
AbstractIn this note, we show that a monotonically normal space that is monotonically countably meta...
AbstractFollowing Pareek a topological space X is called D-paracompact if for every open cover A of ...
AbstractA space X is Lindelöf-normal or L-normal if every Lindelöf closed subset of X has arbitraril...
AbstractWe proved that ⋄+ implies the existence of a non-D-space whose all closed subspace F satisfi...
AbstractWe use U-sticky sets to show that box products of scattered spaces of height 1 are D-spaces ...
AbstractWe prove that if X is a paracompact monotonically normal space, and Y has a point-countable ...
AbstractTwo theorems are given analyzing the possible refinements of open covers of a monotonically ...
AbstractWe study the D-space property and its generalizations, the notions of an aD-space and a weak...
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