Ladder mice

Abstract

Assume ZF + AD + V=L(R). We prove some "mouse set" theorems, for definability over Jα(R) where [α,α] is a projective-like gap (of L(R)) and α is either a successor ordinal or has countable cofinality, but α≠β+1 where β ends a strong gap. For such ordinals α and integers n≥ 1, we show that there is a mouse M with R M=ODα n. The proof involves an analysis of ladder mice and their generalizations to Jα(R). This analysis is related to earlier work of Rudominer, Woodin and Steel on ladder mice. However, it also yields a new proof of the mouse set theorem even at the least point where ladder mice arise -- one which avoids the stationary tower. The analysis also yields a corresponding "anti-correctness" result on a cone, generalizing facts familiar in the projective hierarchy; for example, that (13)V M1 truth is (13)M1-definable and (13)M1 truth is (13)V M1-definable. We also define and study versions of ladder mice on a cone at the end of weak gap, and at the successor of the end of a strong gap, and an anti-correctness result on a cone there.