On the cut-elimination of the modal μ-calculus: Linear Logic to the rescue

Abstract

This paper presents a proof-theoretic analysis of the modal μ-calculus. More precisely, we prove a syntactic cut-elimination for the non-wellfounded modal μ-calculus, using methods from linear logic and its exponential modalities. To achieve this, we introduce a new system, μLLmodinf, which is a linear version of the modal μ-calculus, intertwining the modalities from the modal μ-calculus with the exponential modalities from linear logic. Our strategy for proving cut-elimination involves (i) proving cut-elimination for μLLmodinf and (ii) translating proofs of the modal mu-calculus into this new system via a ``linear translation'', allowing us to extract the cut-elimination result.