Counting the maximal intermediate constructive logics

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Journal of Symbolic Logic 58 (4):1365-1401 (1993)
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Abstract

A proof is given that the set of maximal intermediate propositional logics with the disjunction property and the set of maximal intermediate predicate logics with the disjunction property and the explicit definability property have the power of continuum. To prove our results, we introduce various notions which might be interesting by themselves. In particular, we illustrate a method to generate wide sets of pairwise "constructively incompatible constructive logics". We use a notion of "semiconstructive" logic and define wide sets of "constructive" logics by representing the "constructive" logics as "limits" of decreasing sequences of "semiconstructive" logics. Also, we introduce some generalizations of the usual filtration techniques for propositional logics. For instance, "filtrations over rank formulas" are used to show that any two different logics belonging to a suitable uncountable set of "constructive" logics are "constructively incompatible"

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10.2307/2275149

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Citations of this work

Proof analysis in intermediate logics.Roy Dyckhoff & Sara Negri - 2012 - Archive for Mathematical Logic 51 (1):71-92.
On Harrop disjunction property in intermediate predicate logics.Katsumasa Ishii - 2023 - Archive for Mathematical Logic 63 (3):317-324.

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References found in this work

A result on propositional logics having the disjunction property.Robert E. Kirk - 1982 - Notre Dame Journal of Formal Logic 23 (1):71-74.

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