The Sigma_1-definable universal finite sequence
Abstract
We introduce the -definable universal finite sequence and prove that it exhibits the universal extension property amongst the countable models of set theory under end-extension. That is, (i) the sequence is -definable and provably finite; (ii) the sequence is empty in transitive models; and (iii) if is a countable model of set theory in which the sequence is and is any finite extension of in this model, then there is an end-extension of to a model in which the sequence is . Our proof method grows out of a new infinitary-logic-free proof of the Barwise extension theorem, by which any countable model of set theory is end-extended to a model of or indeed any theory true in a suitable submodel of the original model. The main theorem settles the modal logic of end-extensional potentialism, showing that the potentialist validities of the models of set theory under end-extensions are exactly the assertions of S4. Finally, we introduce the end-extensional maximality principle, which asserts that every possibly necessary sentence is already true, and show that every countable model extends to a model satisfying it.
Keywords
Cite
@article{arxiv.1909.09100,
title = {The Sigma_1-definable universal finite sequence},
author = {Joel David Hamkins and Kameryn J. Williams},
journal= {arXiv preprint arXiv:1909.09100},
year = {2020}
}
Comments
18 pages