Exactly n-resolvable Topological Expansions

Abstract

For a cardinal, a space X=(X,) is - resolvable if X admits -many pairwise disjoint -dense subsets; (X,) is exactly - resolvable if it is -resolvable but not +-resolvable. The present paper complements and supplements the authors' earlier work, which showed for suitably restricted spaces (X,) and cardinals ≥λ≥ω that (X,), if -resolvable, admits an expansion ⊃eq, with (X,) Tychonoff if (X,) is Tychonoff, such that (X,) is μ-resolvable for all μ<λ but is not λ-resolvable (cf. Theorem~3.3 of comfhu10). Here the "finite case" is addressed. The authors show in ZFC for 1<n<ω: (a) every n-resolvable space (X,) admits an exactly n-resolvable expansion ⊃eq; (b) in some cases, even with (X,) Tychonoff, no choice of is available such that (X,) is quasi-regular; (c) if n-resolvable, (X,) admits an exactly n-resolvable quasi-regular expansion if and only if either (X,) is itself exactly n-resolvable and quasi-regular or (X,) has a subspace which is either n-resolvable and nowhere dense or is (2n)-resolvable. In particular, every ω-resolvable quasi-regular space admits an exactly n-resolvable quasi-regular expansion. Further, for many familiar topological properties , one may choose so that (X,)∈ if (X,)∈.