Split Interpolation: Refining Craig's Theorem via Three-Valued Logics

Abstract

Which choices of truth tables and consequence relations for two logics L1 and L2 ensure the satisfaction of the following split interpolation property: If two formulas φ and share at least one propositional atom and φ classically entails , then there is a formula that shares all its propositional atoms with both φ and , such that φ entails in L1 and entails in L2? We identify the cases in which this property holds for any pair of propositional logics based on the same three-valued Boolean normal monotonic scheme for connectives and two monotonic consequence relations. Since the resulting logics are subclassical, every instance of this property constitutes a particular refinement of Craig's deductive interpolation theorem, as it entails the latter and further restricts the range of possible interpolants.

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