Boolean valued semantics for infinitary logics
Abstract
It is well known that the completeness theorem for fails with respect to Tarski semantics. Mansfield showed that it holds for if one replaces Tarski semantics with boolean valued semantics. We use forcing to improve his result in order to obtain a stronger form of boolean completeness (but only for ). Leveraging on our completeness result, we establish the Craig interpolation property and a strong version of the omitting types theorem for with respect to boolean valued semantics. We also show that a weak version of these results holds for (if one leverages instead on Mansfield's completeness theorem). Furthermore we bring to light (or in some cases just revive) several connections between the infinitary logic and the forcing method in set theory.
Keywords
Cite
@article{arxiv.2112.09416,
title = {Boolean valued semantics for infinitary logics},
author = {Juan M. Santiago and Matteo Viale},
journal= {arXiv preprint arXiv:2112.09416},
year = {2023}
}