Peano Arithmetic and μMALL - Laboratoire d'informatique de l'X (LIX)
Pré-Publication, Document De Travail Année : 2024

Peano Arithmetic and μMALL

Résumé

Formal theories of arithmetic have traditionally been based on either classical or intuitionistic logic, leading to the development of Peano and Heyting arithmetic, respectively. We propose to use μMALL as a formal theory of arithmetic based on linear logic. This formal system is presented as a sequent calculus proof system that extends the standard proof system for multiplicative-additive linear logic (MALL) with the addition of the logical connectives universal and existential quantifiers (first-order quantifiers), term equality and non-equality, and the least and greatest fixed point operators. We first demonstrate how functions defined using μMALL relational specifications can be computed using a simple proof search algorithm. By incorporating weakening and contraction into μMALL, we obtain μLK+, a natural candidate for a classical sequent calculus for arithmetic. While important proof theory results are still lacking for μLK+ (including cut-elimination and the completeness of focusing), we prove that μLK+ is consistent and that it contains Peano arithmetic. We also prove some conservativity results regarding μLK+ over μMALL.
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hal-04824175 , version 1 (06-12-2024)

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Matteo Manighetti, Dale Miller. Peano Arithmetic and μMALL. 2024. ⟨hal-04824175⟩
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