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Finite Tree Property for First-Order Logic with Identity and Functions
Notre Dame Journal of Formal Logic 46 (2):173-180 (2005)
Abstract
The typical rules for truth-trees for first-order logic without functions can fail to generate finite branches for formulas that have finite models–the rule set fails to have the finite tree property. In 1984 Boolos showed that a new rule set proposed by Burgess does have this property. In this paper we address a similar problem with the typical rule set for first-order logic with identity and functions, proposing a new rule set that does have the finite tree propertyOther Versions
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2010-08-24
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Citations of this work
Wittgensteinian Tableaux, Identity, and Co-Denotation.Kai F. Wehmeier - 2008 - Erkenntnis 69 (3):363-376.
References found in this work
Trees and finite satisfiability: proof of a conjecture of Burgess.George Boolos - 1984 - Notre Dame Journal of Formal Logic 25 (3):193-197.
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