Abstract
This article explores goal-directed proof search in first-order multimodal logic. I focus on a family of modal logics which offer the expressive power to specify modular goals and local assumptions. A modular goal must be proved from designated assumptions; conversely, a local assumption can only be used to prove a designated goal. Indefinite modal specifications can avoid combinatorial interactions among independent ambiguities by making separate goals modular and corresponding disjunctive alternatives local. Such specifications can effectively guarantee that provable goals have short proofs. The key result of this article is to establish a sound and complete goal-directed proof system that actively uses the modularity and locality of modal logic to constrain proof search. In particular, logically independent, local ambiguities will not interact in proof search. The challenge is that, in goal-directed proof, a modal prover cannot simply reason locally, in a module, because modularity is a property of formulas rather than proof problems. The result therefore requires prior proof-theoretic justifications of logic programming to be extended, strengthened, and combined with new proof-theoretic analyses of modal deduction.
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