Projective Games on the Reals
Abstract
Let denote the minimal active iterable extender model which has Woodin cardinals and contains all reals, if it exists, in which case we denote by the class-sized model obtained by iterating the topmost measure of class-many times. We characterize the sets of reals which are -definable from over , under the assumption that projective games on reals are determined: (1) for even , ; (2) for odd , . This generalizes a theorem of Martin and Steel for , i.e., the case . As consequences of the proof, we see that determinacy of all projective games with moves in is equivalent to the statement that exists for all , and that determinacy of all projective games of length with moves in is equivalent to the statement that exists and satisfies for all .
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