Definability and almost disjoint families

Abstract

We show that there are no infinite maximal almost disjoint ("mad") families in Solovay's model, thus solving a long-standing problem posed by A.D.R. Mathias in 1967. We also give a new proof of Mathias' theorem that no analytic infinite almost disjoint family can be maximal, and show more generally that if Martin's Axiom holds at <20, then no -Souslin infinite almost disjoint family can be maximal. Finally we show that if 1L[a]<1, then there are no 12[a] infinite mad families.