The Countable Admissible Ordinal Equivalence Relation
Abstract
Let be the countable admissible ordinal equivalence relation defined on by if and only if . It will be shown that is classifiable by countable structures and must be classified by structures of high Scott rank. If and are equivalence relations, then is almost Borel reducible to if and only if there is a Borel reduction of to , except possibly on countably many -classes. Let denote the equivalence of order types of reals coding well-orderings. It will be shown that in the constructible universe and set generic extensions of , is not almost Borel reducible to , although a result of Zapletal implies such an almost Borel reduction exists if there is a measurable cardinal. Lastly, it will be shown that the isomorphism relation induced by a counterexample to Vaught's conjecture cannot be Borel reducible to in and set generic extensions of . This shows the consistency of a negative answer to a question of Sy-David Friedman.
Keywords
Cite
@article{arxiv.1601.07924,
title = {The Countable Admissible Ordinal Equivalence Relation},
author = {William Chan},
journal= {arXiv preprint arXiv:1601.07924},
year = {2016}
}