Resum
This paper is a contribution to the study of equality-free logic, that is, first-order logic without equality. We mainly devote ourselves to the study of algebraic characterizations of its relation of elementary equivalence by providing some Keisler-Shelahtype ultrapower theorems and an Ehrenfeucht-Fraïssé type theorem. We also give characterizations of elementary classes in equality- free logic. As a by-product we characterize thesentences that are logically equivalent to an equality-free one. © 1996 by the University of Notre Dame. All rights reserved.
Idioma original | Anglès |
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Pàgines (de-a) | 506-522 |
Revista | Notre Dame Journal of Formal Logic |
Volum | 37 |
Número | 3 |
DOIs | |
Estat de la publicació | Publicada - 1 de gen. 1996 |