Model Theory of Monadic Predicate Logic with the Infinity Quantifier
Abstract
This paper establishes model-theoretic properties of , a variation of monadic first-order logic that features the generalised quantifier (`there are infinitely many'). We provide syntactically defined fragments of characterising four different semantic properties of -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 to a sentence belonging to the corresponding syntactic fragment, with the property that is equivalent to 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 () and without () equality, and then move to by including the generalised quantifier into the picture. As a corollary of our developments, we obtain that the four semantic properties above are decidable for -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.
Cite
@article{arxiv.1809.03262,
title = {Model Theory of Monadic Predicate Logic with the Infinity Quantifier},
author = {Facundo Carreiro and Alessandro Facchini and Yde Venema and Fabio Zanasi},
journal= {arXiv preprint arXiv:1809.03262},
year = {2018}
}