6533b7d7fe1ef96bd126843a

RESEARCH PRODUCT

Covering by discrete and closed discrete sets.

Santi Spadaro

subject

Open setMathematics::General TopologyBaireBaire measure01 natural sciencesComplete metric spaceDiscrete setFOS: MathematicsProperty of Baire0101 mathematicsDispersion characterMoore spaceMathematicsMathematics - General TopologyDiscrete mathematicsMoore space (topology)σ-space010102 general mathematicsGeneral Topology (math.GN)Baire spaceBaire property010101 applied mathematicsMetric spaceMathematics::Logic54A25 54E52Baire category theoremSettore MAT/03 - GeometriaGeometry and TopologyLOTSsigma-space

description

Say that a cardinal number $\kappa$ is \emph{small} relative to the space $X$ if $\kappa <\Delta(X)$, where $\Delta(X)$ is the least cardinality of a non-empty open set in $X$. We prove that no Baire metric space can be covered by a small number of discrete sets, and give some generalizations. We show a ZFC example of a regular Baire $\sigma$-space and a consistent example of a normal Baire Moore space which can be covered by a small number of discrete sets. We finish with some remarks on linearly ordered spaces.

yearjournalcountryeditionlanguage
2008-09-10
http://hdl.handle.net/20.500.11769/244518