Mathieu Baillif
Published 2012-06-04, updated 2015-03-22Version 3
A space is od-compact (resp. od-Lindel\"of) provided any cover by open dense sets has a finite (resp. countable) subcover. We first show with simple examples that these properties behave quite poorly under finite or countable unions. We then investigate the relations between Lindel\"ofness, od-Lindel\"ofness and linear Lindel\"ofness (and similar relations with `compact'). We prove in particular that if a $T_1$ space is od-compact, then the subset of its non-isolated points is compact. If a $T_1$ space is od-Lindel\"of, we only get that the subset of its non-isolated points is linearly Lindel\"of. Though, Lindel\"ofness follows if the space is moreover locally openly Lindel\"of (i.e. each point has an open Lindel\"of neighborhood).
Comments: 13 pages, one figure. V2: We added a note concerning the fact that Mills and Wattel had proved a more general result in 1979. The author was unaware of it at the time of publication
Journal: Top. Proc. 42 (2013) pp. 141-156
Regular Bases At Non-isolated Points And Metrization Theorems
Uniform covers at non-isolated points
Open uniform (G) at non-isolated points and maps
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