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

Abstract

Assume that \(Mn\), the canonical inner model with \(n\) Woodin cardinals, exists. We force a model with continuum \(2\) in which every \(Σ1n+2\) set of reals is Lebesgue measurable and has the Baire property, the \(Σ1n+2\)- and \(Π1n+3\)-uniformization properties hold, and the reals admit a \(Δ1n+3\)-definable well-order. Thus regularity up to a fixed finite projective level, together with a definable well-order of the reals at the adjacent level, does not force the determinacy strength which would normally explain that regularity, even when this package is strengthened by adjacent \(Σ\)- and \(Π\)-uniformization. In particular, this gives a negative answer to a local form of Woodin's twelfth Delfino problem asked by Friedman-Schindler.