Abstract
The intuitionistic propositional logic I has the following disjunction property
This property does not characterize intuitionistic logic. For example Kreisel and Putnam [5] showed that the extension of I with the axiomhas the disjunction property. Another known system with this propery is due to Scott [5], and is obtained by adding to I the following axiom:In the present paper we shall prove, using methods originally introduced by Segerberg [10], that the Kreisel-Putnam logic is decidable. In fact we shall show that it has the finite model property, and since it is finitely axiomatizable, it is decidable by [4]. The decidability of Scott's system was proved by J. G. Anderson in his thesis in 1966.
Publisher
Cambridge University Press (CUP)
Reference11 articles.
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4. Gabbay D. and de Jongh D. , Sequences of decidable, finitely axiomatizable intermediate logics with the disjunction property, to appear.
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