Compactness and Symmetric Well Orders

Abstract

We introduce and investigate a topological version of St\"ackel's 1907 characterization of finite sets, with the goal of obtaining an interesting notion that characterizes usual compactness (or a close variant of it). Define a T2 topological space (X, τ) to be St\"ackel-compact if there is some linear ordering on X such that every non-empty τ-closed set contains a -least and a -greatest element. We find that compact spaces are St\"ackel-compact but not conversely, and St\"ackel-compact spaces are countably compact. The equivalence of St\"ackel-compactness with countable compactness remains open, but our main result is that this equivalence holds in scattered spaces of Cantor-Bendixson rank < ω2 under ZFC. Under V=L, the equivalence holds in all scattered spaces.

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