Model Theory of Monadic Predicate Logic with the Infinity Quantifier

TL;DR

This paper explores the model-theoretic properties of a monadic first-order logic with an infinity quantifier, providing syntactic characterizations of semantic properties and establishing decidability results.

Contribution

It introduces effective syntactic fragments for four semantic properties in $ ext{FOE}^inity$, extending prior monadic logic results to include the infinity quantifier.

Findings

Semantic properties are decidable for $ ext{FOE}^inity$-sentences.

Effective translation maps are constructed for each semantic property.

Results extend to automata theory and expressiveness in monadic second-order logic.

Abstract

This paper establishes model-theoretic properties of $\mathrm{FOE}^{\infty}$, a variation of monadic first-order logic that features the generalised quantifier $\exists^\infty$ (`there are infinitely many'). We provide syntactically defined fragments of $\mathrm{FOE}^{\infty}$ characterising four different semantic properties of $\mathrm{FOE}^{\infty}$-sentences: (1) being monotone and (2) (Scott) continuous in a given set of monadic predicates; (3) having truth preserved under taking submodels or (4) invariant under taking quotients. In each case, we produce an effectively defined map that translates an arbitrary sentence $\varphi$ to a sentence $\varphi^{p}$ belonging to the corresponding syntactic fragment, with the property that $\varphi$ is equivalent to $\varphi^{p}$ precisely when it has the associated semantic property. Our methodology is first to provide these results in the simpler setting of monadic first-order logic with ($\mathrm{FOE}$) and without ($\mathrm{FO}$) equality, and then move to $\mathrm{FOE}^{\infty}$ by including the generalised quantifier $\exists^\infty$ into the picture. As a corollary of our developments, we obtain that the four semantic properties above are decidable for $\mathrm{FOE}^{\infty}$-sentences. Moreover, our results are directly relevant to the characterisation of automata and expressiveness modulo bisimilirity for variants of monadic second-order logic. This application is developed in a companion paper.