Completeness theorems for modal logic in second-order arithmetic
Abstract
This paper investigates the logical strength of completeness theorems for modal propositional logic within second-order arithmetic. We demonstrate that the weak completeness theorem for modal propositional logic is provable in RCA0, and that, over RCA0, ACA0 is equivalent to the strong completeness theorem for modal propositional logic using canonical models. We also consider a simpler version of the strong completeness theorem without referring to canonical models and show that it is equivalent to WKL0 over RCA0.
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