Grunnleggende konsepter
Every proof in the deep inference system MAV can be normalized to a cut-free proof using a semantic model construction.
Sammendrag
The content presents a semantic proof of the admissibility of the cut rule and other "non-analytic" rules in the deep inference system MAV, which extends the basic system BV with additives.
Key highlights:
- MAV is a deep inference system that extends linear logic with a self-dual non-commutative connective capturing sequential composition.
- Existing proofs of cut elimination for deep inference systems like MAV rely on intricate syntactic reasoning and complex termination measures.
- The authors develop an algebraic semantics for MAV, called MAV-algebras, and a weaker notion of MAV-frames.
- They show that every MAV-frame can be completed to an MAV-algebra, and that the MAV-frame constructed from normal proofs is strongly complete for MAV.
- This allows them to prove that every MAV-provable structure has a normal proof, avoiding the use of the cut rule and other "non-analytic" rules.
- The proofs are constructive and have been mechanized in the Agda proof assistant.