A characterization of Continuous Logic by using quantale-valued logics
Logic
2024-06-13 v2
Abstract
In this paper, we propose a generalization of Continuous Logic ([BBHU08]) where the distances take values in suitable co-quantales (in the way as it was proposed in [Fla97]). By assuming suitable conditions (e.g., being co-divisible, co-Girard and a V-domain), we provide, as test questions, a proof of a version of the Tarski-Vaught test (Proposition 4.2) and {\L}o\'s Theorem (Theorem 5.27) in our setting. Iovino proved in [Iov01] that there is no any logic extending (equivalent logics to) Continuous Logic satisfying both Countable Tarski-Vaught chain Theorem and Compactness Theorem. Since [0, 1] satisfies all of the assumptions given above, we get new logics by dropping any of those assumptions.
Cite
@article{arxiv.2102.06067,
title = {A characterization of Continuous Logic by using quantale-valued logics},
author = {David Reyes and Pedro H. Zambrano},
journal= {arXiv preprint arXiv:2102.06067},
year = {2024}
}