arXiv:2211.07972 Abstract | arXiv Analytics

arXiv:2211.07972 [math.GN]Abstract References Reviews Resources

A Hofmann-Mislove theorem for $c$-well-filtered spaces

Published 2022-11-15Version 1

The Hofmann-Mislove theorem states that in a sober space, the nonempty Scott open filters of its open set lattice correspond bijectively to its compacts saturated sets. In this paper, the concept of $c$-well-filtered spaces is introduced. We show that a retract of a $c$-well-filtered space is $c$-well-filtered and a locally Lindel\"{o}f and $c$-well-filtered $P$-space is countably sober. In particular, we obtain a Hofmann-Mislove theorem for $c$-well-filtered spaces.

Categories: math.GN

Subjects: 54H99

Keywords: well-filtered space, nonempty scott open filters, open set lattice correspond, hofmann-mislove theorem states, sober space

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