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The equivalence of the disjunction and existence properties for modal arithmetic
Journal of Symbolic Logic 54 (4):1456-1459 (1989)
Abstract
In a modal system of arithmetic, a theory S has the modal disjunction property if whenever $S \vdash \square\varphi \vee \square\psi$ , either $S \vdash \square\varphi$ or $S \vdash \square\psi. S$ has the modal numerical existence property if whenever $S \vdash \exists x\square\varphi(x)$ , there is some natural number n such that $S \vdash \square\varphi(\mathbf{n})$ . Under certain broadly applicable assumptions, these two properties are equivalentAuthor's Profile
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Citations of this work
The disjunction property of intermediate propositional logics.Alexander Chagrov & Michael Zakharyashchev - 1991 - Studia Logica 50 (2):189 - 216.
Provability in principle and controversial constructivistic principles.Leon Horsten - 1997 - Journal of Philosophical Logic 26 (6):635-660.
Informal Provability, First-Order BAT Logic and First Steps Towards a Formal Theory of Informal Provability.Pawel Pawlowski & Rafal Urbaniak - forthcoming - Logic and Logical Philosophy:1-27.
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