Add to ORKGWe study the class of first-countable Lindel\"of scattered spaces, or "FLS" spaces. While every $T_3$ FLS space is homeomorphic to a scattered subspace of $\mathbb Q$, the class of $T_2$ FLS spaces turns out to be surprisingly rich. Our investigation of these spaces reveals close ties to $Q$-sets, Lusin sets, and their relatives, and to the cardinals $\mathfrak{b}$ and $\mathfrak{d}$. Many natural questions about FLS spaces turn out to be independent of $\mathsf{ZFC}$. We prove that there exist uncountable FLS spaces with scattered height $\omega$. On the other hand, an uncountable FLS space with finite scattered height exists if and only if $\mathfrak{b} = \aleph_1$. We prove some independence results concerning the possible cardinalitie...
summary:The set of isolated points (resp. $P$-points) of a Tychonoff space $X$ is denoted by $\opera...
The set of isolated points (resp. P-points) of a Tychonoff space X is denoted by Is(X) (resp. P(X))....
A space is said to be "almost discretely Lindelöf" if every discrete subset can be covered by a Lind...
AbstractWe find a model of set theory in which there is a Lindelöf scattered space of cardinality > ...
AbstractWe show that a known restriction on the cardinalities of closures of subspaces of scattered ...
We show that each O-dimensional Hausdorff space which is scattered can be mapped continuously in a o...
AbstractWe show in a direct way that a space is D if it is a finite union of subparacompact scattere...
AbstractIt was proved by Dow and Simon that there are 2ω1 (as many as possible) pairwise nonhomeomor...
We study in this paper some of the topological structure associated with scattered spaces, a-scatter...
We study in this paper some of the topological structure associated with scattered spaces, a-scatter...
AbstractWe show that if X is a regular D¯-scattered space and X is the union of a finite collection ...
AbstractWe consider the question of whether uncountable Lindelöf spaces have Lindelöf subspaces of s...
summary:We shall prove that under CH every regular meta-Lindelöf $P$-space which is locally $D$ has ...
AbstractA topological space X is called linearly Lindelöf if every increasing open cover of X has a ...
AbstractUnder either CH or not-SH, there exists a 0-dimensional Hausdorff space of countable spread ...
summary:The set of isolated points (resp. $P$-points) of a Tychonoff space $X$ is denoted by $\opera...
The set of isolated points (resp. P-points) of a Tychonoff space X is denoted by Is(X) (resp. P(X))....
A space is said to be "almost discretely Lindelöf" if every discrete subset can be covered by a Lind...
AbstractWe find a model of set theory in which there is a Lindelöf scattered space of cardinality > ...
AbstractWe show that a known restriction on the cardinalities of closures of subspaces of scattered ...
We show that each O-dimensional Hausdorff space which is scattered can be mapped continuously in a o...
AbstractWe show in a direct way that a space is D if it is a finite union of subparacompact scattere...
AbstractIt was proved by Dow and Simon that there are 2ω1 (as many as possible) pairwise nonhomeomor...
We study in this paper some of the topological structure associated with scattered spaces, a-scatter...
We study in this paper some of the topological structure associated with scattered spaces, a-scatter...
AbstractWe show that if X is a regular D¯-scattered space and X is the union of a finite collection ...
AbstractWe consider the question of whether uncountable Lindelöf spaces have Lindelöf subspaces of s...
summary:We shall prove that under CH every regular meta-Lindelöf $P$-space which is locally $D$ has ...
AbstractA topological space X is called linearly Lindelöf if every increasing open cover of X has a ...
AbstractUnder either CH or not-SH, there exists a 0-dimensional Hausdorff space of countable spread ...
summary:The set of isolated points (resp. $P$-points) of a Tychonoff space $X$ is denoted by $\opera...
The set of isolated points (resp. P-points) of a Tychonoff space X is denoted by Is(X) (resp. P(X))....
A space is said to be "almost discretely Lindelöf" if every discrete subset can be covered by a Lind...