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A Linear Perspective on Cut-Elimination for Non-wellfounded Sequent Calculi with Least and Greatest Fixed-Points

Alexis Saurin

2023Lecture notes in computer science10 citationsDOIOpen Access PDF

Abstract

Abstract This paper establishes cut-elimination for $$\mathsf {\mu LL^\infty }$$ , $$\mathsf {\mu LK^\infty }$$ and $$\mathsf {\mu LJ^\infty }$$ , that are non-wellfounded sequent calculi with least and greatest fixed-points, by expanding on prior works by Santocanale and Fortier [20] as well as Baelde et al. [3, 4]. The paper studies a fixed-point encoding of $$\textsf{LL}$$ exponentials in order to deduce those cut-elimination results from that of $$\mathsf {\mu MALL^\infty }$$ . Cut-elimination for $$\mathsf {\mu LK^\infty }$$ and $$\mathsf {\mu LJ^\infty }$$ is obtained by developing appropriate linear decorations for those logics.

Topics & Concepts

SequentOrder (exchange)CombinatoricsFixed pointMathematicsFixed-point theoremExponential functionDiscrete mathematicsMathematical analysisEconomicsFinanceLogic, programming, and type systemsFormal Methods in VerificationLogic, Reasoning, and Knowledge
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