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The Decidability of the $ \forall^*\exists$ Class and the Axiom of Foundation
Notre Dame Journal of Formal Logic 42 (1):41-53 (2001)
Abstract
We show that the Axiom of Foundation, as well as the Antifoundation Axiom AFA, plays a crucial role in determining the decidability of the following problem. Given a first-order theory T over the language $ =,\in$, and a sentence F of the form $ \forall x_1, \ldots, x_n \exists y F^M$ with $ F^M$ quantifier-free in the same language, are there models of T in which F is true? Furthermore we show that the Extensionality Axiom is quite irrelevant in that respectLinks
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References found in this work
Decidability of ∀*∀‐Sentences in Membership Theories.Eugenio G. Omodeo, Franco Parlamento & Alberto Policriti - 1996 - Mathematical Logic Quarterly 42 (1):41-58.
Expressing infinity without foundation.Franco Parlamento & Alberto Policriti - 1991 - Journal of Symbolic Logic 56 (4):1230-1235.
Decidability and Completeness for Open Formulas of Membership Theories.Dorella Bellè & Franco Parlamento - 1995 - Notre Dame Journal of Formal Logic 36 (2):304-318.
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