G\"odel Logic: from Natural Deduction to Parallel Computation
Logic in Computer Science
2017-06-20 v4
Abstract
Propositional G\"odel logic extends intuitionistic logic with the non-constructive principle of linearity . We introduce a Curry-Howard correspondence for this logic and show that a particularly simple natural deduction calculus can be used as a typing system. The resulting functional language enriches the simply typed lambda calculus with a synchronous communication mechanism between parallel processes. Our normalization proof employs original termination arguments and sophisticated proof transformations with a meaningful computational reading. Our results provide a computational interpretation of G\"odel logic as a logic of communicating parallel processes, thus proving Avron's 1991 conjecture.
Keywords
Cite
@article{arxiv.1607.05120,
title = {G\"odel Logic: from Natural Deduction to Parallel Computation},
author = {Federico Aschieri and Agata Ciabattoni and Francesco A. Genco},
journal= {arXiv preprint arXiv:1607.05120},
year = {2017}
}