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Definability of Leibniz equality
Studia Logica 63 (2):223-243 (1999)
Abstract
Given a structure for a first-order language L, two objects of its domain can be indiscernible relative to the properties expressible in L, without using the equality symbol, and without actually being the same. It is this relation that interests us in this paper. It is called Leibniz equality. In the paper we study systematically the problem of its definibility mainly for classes of structures that are the models of some equality-free universal Horn class in an infinitary language Lκκ, where κ is an infinite regular cardinal.Author's Profile
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Citations of this work
A survey of abstract algebraic logic.J. M. Font, R. Jansana & D. Pigozzi - 2003 - Studia Logica 74 (1-2):13 - 97.
On the Closure Properties of the Class of Full G-models of a Deductive System.Josep Maria Font, Ramon Jansana & Don Pigozzi - 2006 - Studia Logica 83 (1-3):215-278.
Relation Formulas for Protoalgebraic Equality Free Quasivarieties; Pałasińska’s Theorem Revisited.Anvar M. Nurakunov & Michał M. Stronkowski - 2013 - Studia Logica 101 (4):827-847.
Categorical abstract algebraic logic: The Diagram and the Reduction Operator Lemmas.George Voutsadakis - 2007 - Mathematical Logic Quarterly 53 (2):147-161.
References found in this work
Some characterization theorems for infinitary universal horn logic without equality.Pilar Dellunde & Ramon Jansana - 1996 - Journal of Symbolic Logic 61 (4):1242-1260.
Some characterization theorems for infinitary universal Horn logic without equality.Pilar Dellunde & Ramon Jansana - 1996 - Journal of Symbolic Logic 61 (4):1242-1260.
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