English

Absolute model companionship, forcibility, and the continuum problem

Logic 2022-12-06 v9

Abstract

Absolute model companionship (AMC) is a strict strengthening of model companionship defined as follows: For a theory TT, TT_{\exists\vee\forall} denotes the logical consequences of TT which are boolean combinations of universal sentences. TT^* is the AMC of TT if it is model complete and T=TT_{\exists\vee\forall}=T^*_{\exists\vee\forall}. We use AMC to study the continuum problem and to gauge the expressive power of forcing. We show that (a definable version of) 20=22^{\aleph_0}=\aleph_2 is the unique solution to the continuum problem which can be in the AMC of a "partial Morleyization" of the \in-theory ZFC+\mathsf{ZFC}+"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 ψ\psi expressible as a Π2\Pi_2-sentence of a (very large fragment of) third order arithmetic (CH\mathsf{CH}, the Suslin hypothesis, the Whitehead conjecture for free groups are a small sample of such problems ψ\psi). Partial Morleyizations can be described as follows: let Formτ\mathsf{Form}_{\tau} be the set of first order τ\tau-formulae; for AFormτA\subseteq \mathsf{Form}_\tau, τA\tau_A is the expansion of τ\tau adding atomic relation symbols RϕR_\phi for all formulae ϕ\phi in AA and Tτ,AT_{\tau,A} is the τA\tau_A-theory asserting that each τ\tau-formula ϕ(x)A\phi(\vec{x})\in A is logically equivalent to the corresponding atomic formula Rϕ(x)R_\phi(\vec{x}). For a τ\tau-theory TT T+Tτ,AT+T_{\tau,A} is the partial Morleyization of TT induced by AFormτA\subseteq \mathsf{Form}_\tau. Finally we characterize a strong form of Woodin's axiom ()(*) as the assertion that the first order theory of H2H_{\aleph_2} 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

R2 v1 2026-06-24T05:42:22.527Z