Definable Maximal Independent Families
Abstract
We study maximal independent families (m.i.f.) in the projective hierarchy. We show that (a) the existence of a 12 m.i.f. is equivalent to the existence of a 11 m.i.f., (b) in the Cohen model, there are no projective maximal independent families, and (c) in the Sacks model, there is a 11 m.i.f. We also consider a new cardinal invariant related to the question of destroying or preserving maximal independent families.
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