English

Reduction games, provability, and compactness

Logic 2021-12-02 v2

Abstract

Hirschfeldt and Jockusch (2016) introduced a two-player game in which winning strategies for one or the other player precisely correspond to implications and non-implications between Π21\Pi^1_2 principles over ω\omega-models of RCA0\mathsf{RCA}_0. They also introduced a version of this game that similarly captures provability over RCA0\mathsf{RCA}_0. We generalize and extend this game-theoretic framework to other formal systems, and establish a certain compactness result that shows that if an implication QP\mathsf{Q} \to \mathsf{P} between two principles holds, then there exists a winning strategy that achieves victory in a number of moves bounded by a number independent of the specific run of the game. This compactness result generalizes an old proof-theoretic fact noted by H.~Wang (1981), and has applications to the reverse mathematics of combinatorial principles. We also demonstrate how this framework leads to a new kind of analysis of the logical strength of mathematical problems that refines both that of reverse mathematics and that of computability-theoretic notions such as Weihrauch reducibility, allowing for a kind of fine-structural comparison between Π21\Pi^1_2 principles that has both computability-theoretic and proof-theoretic aspects, and can help us distinguish between these, for example by showing that a certain use of a principle in a proof is "purely proof-theoretic", as opposed to relying on its computability-theoretic strength. We give examples of this analysis to a number of principles at the level of BΣ20\mathsf{B}\Sigma^0_2, uncovering new differences between their logical strengths.

Keywords

Cite

@article{arxiv.2008.00907,
  title  = {Reduction games, provability, and compactness},
  author = {Damir D. Dzhafarov and Denis R. Hirschfeldt and Sarah C. Reitzes},
  journal= {arXiv preprint arXiv:2008.00907},
  year   = {2021}
}

Comments

Accepted for publication in Journal of Mathematical Logic

R2 v1 2026-06-23T17:36:13.984Z