On a local variant of the 12th Delfino problem -- the Σ-side

Abstract

Assuming that Mn, the canonical inner model with n Woodin cardinals, exists, we force a model in which every Σ1n+2 set is Lebesgue measurable and has the Baire property, and in which Σ1n+2+m-uniformization holds for every m∈ω. Additionally, this universe has a Δ1n+3-definable wellorder of the reals. This answers a question of S. D. Friedman and R. Schindler from 1999. In the case n=1, the construction also gives a model with one Woodin cardinal in which all Σ13 sets are measurable with respect to the random, Cohen, Sacks and Miller notions of measurability, while a Δ14-definable wellorder of the reals exists answering an instance of a question of S. D. Friedman and D. Schrittesser.