Cardinal invariants of a meager ideal

Abstract

Let MX denote the ideal of meager subsets of a topological space X. We prove that if X is a completely metrizable space without isolated points, then the smallest cardinality of a non-meager subset of X, denoted non( MX), is exactly non( MX) = cf[]ω · non( M R), where is the minimum weight of a nonempty open subset of X. We also characterize the additivity and covering numbers for MX in terms of simple topological properties of X. Some bounds are proved and some questions raised concerning the cofinality of MX and the cofinality of the related ideal of nowhere dense subsets of X. We also show that if X is a compact Hausdorff space with π-weight , then non( MX) ≤ cf[]ω · non( M R). This bound for compact Hausdorff spaces is not sharp, in the sense that it is consistent for such a space to have non-meager subsets of even smaller cardinality.

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