The consistency strength of long projective determinacy

Abstract

We determine the consistency strength of determinacy for projective games of length ω2. Our main theorem is that 1n+1-determinacy for games of length ω2 implies the existence of a model of set theory with ω + n Woodin cardinals. In a first step, we show that this hypothesis implies that there is a countable set of reals A such that Mn(A), the canonical inner model for n Woodin cardinals constructed over A, satisfies A = R and the Axiom of Determinacy. Then we argue how to obtain a model with ω + n Woodin cardinal from this. We also show how the proof can be adapted to investigate the consistency strength of determinacy for games of length ω2 with payoff in R 11 or with σ-projective payoff.