The happy coexistence of mad families and Laver measurability

Abstract

Let x denote a Laver real over L. We prove that in L[x] there is a 11 infinite mad family. Since 11 and 12 sets are Laver measurable in L[x], this shows that there are examples of well-behaved classical pointclasses , namely =11 and =12, where -uniformization and ``all sets in are Laver measurable'' hold, but there is a mad family in . This result stands in contrast to that for reasonable pointclasses, the -Ramsey property together with uniformization implies that there are no mad families in .

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