Locally tabular products of modal logics

Abstract

In the product L1× L2 of two Kripke complete consistent logics, local tabularity of L1 and L2 is necessary for local tabularity of L1× L2. However, it is not sufficient: the product of two locally tabular logics may not be locally tabular. We provide extra semantic and axiomatic conditions that give criteria of local tabularity of the product of two locally tabular logics, and apply them to identify new families of locally tabular products. We show that the product of two locally tabular logics may lack the product finite model property. We give an axiomatic criterion of local tabularity for all extensions of S4.1 [ 2 ]× S5. Finally, we describe a new prelocally tabular extension of S4× S5.

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