Strong reducibilities and set theory
Abstract
We study Medvedev reducibility in the context of set theory -- specifically, forcing and large cardinal hypotheses. Answering a question of Hamkins and Li \cite{HaLi}, we show that the Medvedev degrees of countable ordinals are far from linearly ordered in multiple ways, our main result here being that there is a club of ordinals which is an antichain with respect to Medvedev reducibility. We then generalize these results to arbitrary ``reasonably-definable" reducibilities, under appropriate set-theoretic hypotheses. We then turn from ordinals to general structures. We show that some of the results above yield characterizations of counterexamples to Vaught's conjecture; another applies to all situations, assigning an ordinal to any reasonable class of structures and ``measure" on that class. We end by discussing some directions for future research.
Cite
@article{arxiv.2408.17393,
title = {Strong reducibilities and set theory},
author = {Noah Schweber},
journal= {arXiv preprint arXiv:2408.17393},
year = {2024}
}
Comments
Old work, long delayed by my having left academia