How to optimize proof-search in modal logics: a new way of proving redundancy criteria for sequent calculi

Abstract

We present a bottom-up decision procedure for propositional modal logic K based on the inverse method. The procedure is based on the "inverted" version of a sequent calculus. To restrict the search space; we prove a number of redundancy criteria for derivations in the sequent calculus. We introduce a new technique of proving redundancy criteria, based on the analysis of tableau-based derivations in K. Moreover another new technique is used to prove completeness of proof-search with a strong notion of subsumption. This technique is based on so-called traces. A new formalization of the inverse method in the form of a path calculus considerably simplifies all proofs as compared to the previously published presentations of the inverse method. Experimental results reported elsewhere demonstrate that our method is competitive with many state-of-the-art implementations of K.