Ramsey Property and Pathological Sets: Almost Disjointness, Independence and Other Maximal Objects

Abstract

We show that under ZF + CC R, if the Ramsey property holds for all sets in a good pointclass , then there is no MAD family in , proving a long-standing conjecture made by A.R.D.\ Mathias in 1977. This also holds for I-MAD families with respect to analytic ideals I including ED, EDfin, and α for all countable ordinals α. Under the same assumption, we show that if any one of the Baire property, Lebesgue measurability or Ramsey property holds for all sets in , then there is no maximal independent family in . Under the stronger assumption ZF + DC R, we further prove that if the Ramsey property holds for all sets in , then contains no Vitali sets and thus no Hamel bases.