Author:
ALIZADEH MAJID,DERAKHSHAN FARZANEH,ONO HIROAKIRA
Abstract
AbstractUniform interpolation property of a given logic is a stronger form of Craig’s interpolation property where both pre-interpolant and post-interpolant always exist uniformly for any provable implication in the logic. It is known that there exist logics, e.g., modal propositional logic S4, which have Craig’s interpolation property but do not have uniform interpolation property. The situation is even worse for predicate logics, as classical predicate logic does not have uniform interpolation property as pointed out by L. Henkin.In this paper, uniform interpolation property of basic substructural logics is studied by applying the proof-theoretic method introduced by A. Pitts (Pitts, 1992). It is shown that uniform interpolation property holds even for their predicate extensions, as long as they can be formalized by sequent calculi without contraction rules. For instance, uniform interpolation property of full Lambek predicate calculus, i.e., the substructural logic without any structural rule, and of both linear and affine predicate logics without exponentials are proved.
Publisher
Cambridge University Press (CUP)
Subject
Logic,Philosophy,Mathematics (miscellaneous)
Reference29 articles.
1. A sheaf representation and duality for finitely presented Heyting algebras
2. Sequent-systems and groupoid models. I
3. Hudelmaier J . (1989). Bounds for cut elimination in intuitionistic propositional logic. PhD Thesis, University of Tübingen.
4. The many faces of interpolation
5. Intuitionistic system without contraction;Dardžaniá;Bulletin of the Section of Logic,1977
Cited by
4 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献