Local tabularity in MS4 with Casari's axiom

Abstract

We study local tabularity (local finiteness) in some extensions of MS4 (monadic S4). Our main result is a semantic characterization of local finiteness in varieties of M+S4-algebras, where M+S4 denotes the extension of MS4 by the Casari axiom. We improve this to a syntactic criterion via the reducible path property identified in [Shap16], and note that the product logic S4[n] × S5 is an extension of M+S4, obtaining a criterion for extensions of S4[n] × S5 as an application. Next, we give a characterization of local finiteness in varieties of MS4B[2]-algebras, where MS4B denotes the extension of MS4 by the Barcan axiom. We demonstrate that our methods cannot be extended beyond depth 2, as we give a translation of the fusion S52 into MS4B[3] for n ≥ 3 that preserves and reflects local finiteness, suggesting that a characterization there remains difficult. Finally, we also establish the finite model property for some of these logics which are not known to be locally tabular.

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