English

Projective Games on the Reals

Logic 2021-01-19 v2

Abstract

Let Mn(R)M^\sharp_n(\mathbb{R}) denote the minimal active iterable extender model which has nn Woodin cardinals and contains all reals, if it exists, in which case we denote by Mn(R)M_n(\mathbb{R}) the class-sized model obtained by iterating the topmost measure of Mn(R)M_n(\mathbb{R}) class-many times. We characterize the sets of reals which are Σ1\Sigma_1-definable from R\mathbb{R} over Mn(R)M_n(\mathbb{R}), under the assumption that projective games on reals are determined: (1) for even nn, Σ1Mn(R)=RΠn+11\Sigma_1^{M_n(\mathbb{R})} = \Game^\mathbb{R}\Pi^1_{n+1}; (2) for odd nn, Σ1Mn(R)=RΣn+11\Sigma_1^{M_n(\mathbb{R})} = \Game^\mathbb{R}\Sigma^1_{n+1}. This generalizes a theorem of Martin and Steel for L(R)L(\mathbb{R}), i.e., the case n=0n=0. As consequences of the proof, we see that determinacy of all projective games with moves in R\mathbb{R} is equivalent to the statement that Mn(R)M^\sharp_n(\mathbb{R}) exists for all nNn\in\mathbb{N}, and that determinacy of all projective games of length ω2\omega^2 with moves in N\mathbb{N} is equivalent to the statement that Mn(R)M^\sharp_n(\mathbb{R}) exists and satisfies AD\mathsf{AD} for all nNn\in\mathbb{N}.

Keywords

Cite

@article{arxiv.1907.03583,
  title  = {Projective Games on the Reals},
  author = {Juan P. Aguilera and Sandra Müller},
  journal= {arXiv preprint arXiv:1907.03583},
  year   = {2021}
}

Comments

15 pages

R2 v1 2026-06-23T10:14:48.228Z