Tree Rewriting Calculi for Strictly Positive Logics
Abstract
We study strictly positive logics in the language L+, which constructs formulas from , propositional variables, conjunction, and diamond modalities. We begin with the base system K+, the strictly positive fragment of polymodal K, and examine its extensions obtained by adding axioms such as monotonicity, transitivity, and the hierarchy-sensitive interaction axiom ( J), which governs the interplay between modalities of different strengths. The strongest of these systems is the Reflection Calculus ( RC), which corresponds to the strictly positive fragment of polymodal GLP. Our main contribution is a formulation of these logics as tree rewriting systems, establishing both adequacy and completeness through a correspondence between L+ formulas and inductively defined modal trees. We also provide a normalization of the rewriting process, which has exponential complexity when axiom ( J) is absent; otherwise we provide a double-exponential bound. By introducing tree rewriting calculi as practical provability tools for strictly positive logics, we aim to deepen their proof-theoretic analysis and computational applications.
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