Absolute model companionship, forcibility, and the continuum problem
Abstract
Absolute model companionship (AMC) is a strict strengthening of model companionship defined as follows: For a theory , denotes the logical consequences of which are boolean combinations of universal sentences. is the AMC of if it is model complete and . We use AMC to study the continuum problem and to gauge the expressive power of forcing. We show that (a definable version of) is the unique solution to the continuum problem which can be in the AMC of a "partial Morleyization" of the -theory "there are class many supercompact cardinals". We also show that (assuming large cardinals) forcibility overlaps with the apparently weaker notion of consistency for any mathematical problem expressible as a -sentence of a (very large fragment of) third order arithmetic (, the Suslin hypothesis, the Whitehead conjecture for free groups are a small sample of such problems ). Partial Morleyizations can be described as follows: let be the set of first order -formulae; for , is the expansion of adding atomic relation symbols for all formulae in and is the -theory asserting that each -formula is logically equivalent to the corresponding atomic formula . For a -theory is the partial Morleyization of induced by . Finally we characterize a strong form of Woodin's axiom as the assertion that the first order theory of as formalized in a certain natural signature is model complete.
Keywords
Cite
@article{arxiv.2109.02285,
title = {Absolute model companionship, forcibility, and the continuum problem},
author = {Matteo Viale},
journal= {arXiv preprint arXiv:2109.02285},
year = {2022}
}
Comments
This paper systematizes and improves the results appearing in arxiv submissions arXiv:2101.07573, arXiv:2003.07114, arXiv:2003.07120