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Main Authors: Rasga, João, Sernadas, Cristina
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.10287
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author Rasga, João
Sernadas, Cristina
author_facet Rasga, João
Sernadas, Cristina
contents Prawitz suggested expanding a natural deduction system for intuitionistic logic to include rules for classical logic constructors, allowing both intuitionistic and classical elements to coexist without losing their inherent characteristics. Looking at the added rules from the point of view of the Godel-Gentzen translation, led us to propose a general method for the coexistent combination of two logics when a conservative translation exists from one logic (the source) to another (the host). Then we prove that the combined logic is a conservative extension of the original logics, thereby preserving the unique characteristics of each component logic. In this way there is no collapse of one logic into the other in the combination. We also demonstrate that a Gentzen calculus for the combined logic can be induced from a Gentzen calculus for the host logic by considering the translation. This approach applies to semantics as well. We then establish a general sufficient condition for ensuring that the combined logic is both sound and complete. We apply these principles by combining classical and intuitionistic logics capitalizing on the Godel-Gentzen conservative translation, intuitionistic and S4 modal logics relying on the Godel-McKinsey-Tarski conservative translation, and classical and Jaskowski's paraconsistent logics taking into account the existence of a conservative translation.
format Preprint
id arxiv_https___arxiv_org_abs_2504_10287
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle From translations to non-collapsing logic combinations
Rasga, João
Sernadas, Cristina
Logic
Prawitz suggested expanding a natural deduction system for intuitionistic logic to include rules for classical logic constructors, allowing both intuitionistic and classical elements to coexist without losing their inherent characteristics. Looking at the added rules from the point of view of the Godel-Gentzen translation, led us to propose a general method for the coexistent combination of two logics when a conservative translation exists from one logic (the source) to another (the host). Then we prove that the combined logic is a conservative extension of the original logics, thereby preserving the unique characteristics of each component logic. In this way there is no collapse of one logic into the other in the combination. We also demonstrate that a Gentzen calculus for the combined logic can be induced from a Gentzen calculus for the host logic by considering the translation. This approach applies to semantics as well. We then establish a general sufficient condition for ensuring that the combined logic is both sound and complete. We apply these principles by combining classical and intuitionistic logics capitalizing on the Godel-Gentzen conservative translation, intuitionistic and S4 modal logics relying on the Godel-McKinsey-Tarski conservative translation, and classical and Jaskowski's paraconsistent logics taking into account the existence of a conservative translation.
title From translations to non-collapsing logic combinations
topic Logic
url https://arxiv.org/abs/2504.10287