Bisimulations in second-order arithmetic
Abstract
This paper investigates the logical strength of two theorems in modal propositional logic - the Hennessy-Milner theorem and the van Benthem characterization theorem - within the framework of second-order arithmetic. We demonstrate that the Hennessy-Milner theorem is equivalent to ACA0 over RCA0. For the van Benthem characterization theorem, we introduce three variants: the semantic, syntactic, and hybrid forms. We show that the semantic form is provable in RCA0, the syntactic form is provable in PRA, and the hybrid form is equivalent to the weak completeness theorem for first-order logic over RCA0.
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