Cut-elimination for the alternation-free modal mu-calculus
By: Bahareh Afshari, Johannes Kloibhofer
Potential Business Impact:
Makes computer logic proofs shorter and faster.
We present a syntactic cut-elimination procedure for the alternation-free fragment of the modal mu-calculus. Cut reduction is carried out within a cyclic proof system, where proofs are finitely branching but may be non-wellfounded. The structure of such proofs is exploited to directly transform a cyclic proof with cuts into a cut-free one, without detouring through other logics or relying on intermediate machinery for regularisation. Novel ingredients include the use of multicuts and results from the theory of well-quasi-orders, the later used in the termination argument.
Similar Papers
On the cut-elimination of the modal $μ$-calculus: Linear Logic to the rescue
Logic in Computer Science
Makes computer logic proofs simpler and stronger.
The mu-calculus' Alternation Hierarchy is Strict over Non-Trivial Fusion Logics
Logic in Computer Science
Makes computer logic more powerful and complex.
Nested Sequents for Intuitionistic Multi-Modal Logics: Cut-Elimination and Lyndon Interpolation
Logic in Computer Science
Makes math logic easier for computers to understand.