Characterization classes defined without equality

Studia Logica 58 (3):357-394 (1997)
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Abstract

In this paper we mainly deal with first-order languages without equality and introduce a weak form of equality predicate, the so-called Leibniz equality. This equality is characterized algebraically by means of a natural concept of congruence; in any structure, it turns out to be the maximum congruence of the structure. We show that first-order logic without equality has two distinct complete semantics (fll semantics and reduced semantics) related by the reduction operator. The last and main part of the paper contains a series of Birkhoff-style theorems characterizing certain classes of structures defined without equality, not only full classes but also reduced ones.

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10.1023/a:1004978316495

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Citations of this work

First order logic without equality on relativized semantics.Amitayu Banerjee & Mohamed Khaled - 2018 - Annals of Pure and Applied Logic 169 (11):1227-1242.
Algebraic Characterizations for Universal Fragments of Logic.Raimon Elgueta - 1999 - Mathematical Logic Quarterly 45 (3):385-398.
Lattices of Theories in Languages without Equality.J. B. Nation - 2013 - Notre Dame Journal of Formal Logic 54 (2):167-175.

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References found in this work

Algebraizable Logics.W. J. Blok & Don Pigozzi - 2022 - Advanced Reasoning Forum.
Model Theory.C. C. Chang & H. Jerome Keisler - 1992 - Studia Logica 51 (1):154-155.
Reduced products of logical matrices.Janusz Czelakowski - 1980 - Studia Logica 39 (1):19 - 43.
Universal Algebra.George Grätzer - 1982 - Studia Logica 41 (4):430-431.
Definability of Leibniz equality.R. Elgueta & R. Jansana - 1999 - Studia Logica 63 (2):223-243.

View all 7 references / Add more references