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arxiv: 1808.06393 · v1 · pith:CGKHSQJFnew · submitted 2018-08-20 · 💻 cs.LO

Some notes on the superintuitionistic logic of chequered subsets of mathbb{R}^infty

classification 💻 cs.LO
keywords logicaxiomchequeredinftymathbbsubsetssuperintuitionisticanalogue
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I investigate the superintuitionistic analogue of the modal logic of chequered subsets of $\mathbb{R}^\infty$ introduced by van Benthem et al. It is observed that this logic possesses the disjunction property, contains the Scott axiom, fails to contain the Kreisel-Putnam axiom and it is a sublogic of the Medvedev logic.

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  1. Non-finite Axiomatizability of Generalized Medvedev Logics

    cs.LO 2026-06 unverdicted novelty 7.0

    Generalized Medvedev logics from topless finite rooted frame products are not finitely axiomatizable; at least countably many exist and none is least.