Non-meager free sets and independent families

Abstract

Our main result is that, given a collection R of meager relations on a Polish space X such that |R|≤ω, there exists a dense Baire subspace F of X (equivalently, a nowhere meager subset F of X) such that F is R-free for every R∈R. This generalizes a recent result of Banakh and Zdomskyy. As an application, we show that there exists a non-meager independent family on ω, and define the corresponding cardinal invariant. Furthermore, assuming Martin's Axiom for countable posets, our result can be strengthened by substituting "|R|≤ω" with "|R|<c" and "Baire" with "completely Baire".