Abstract
LetL be one of the intuitionistic modal logics considered in [7] (or one of its extensions) and letM L be the “algebraic semantics” ofL. In this paper we will extend toL the equivalence, proved in the classical case (see [6]), among he weak Craig interpolation theorem, the Robinson theorem and the amalgamation property of varietyM L. We will also prove the equivalence between the Craig interpolation theorem and the super-amalgamation property of varietyM L. Then we obtain the Craig interpolation theorem and Robinson theorem for two intuitionistic modal logics, one ofS 4-type and the other one ofS 5-type, showing the super-amalgamation property of the corresponding algebraic semantics.
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