On maximal families of independent sets with respect to asymptotic density

Abstract

We study families of subsets of ω which are independent with respect to the asymptotic density d. We show, for instance, that there exists a maximal d-independent family A such that d[A] attains a prescribed set of values in (0,1) with at most countably many exceptions. In addition, under cov(N)=c, it is possible to construct such A with no exceptions. We also construct 2c maximal d-independent families with pairwise distinct generated density fields and obtain maximal families with strong definability pathologies, including examples without the Baire property and, consistently, nonmeasurable examples.

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