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On the algebraizability of annotated logics
Studia Logica 59 (3):359-386 (1997)
Abstract
Annotated logics were introduced by V.S. Subrahmanian as logical foundations for computer programming. One of the difficulties of these systems from the logical point of view is that they are not structural, i.e., their consequence relations are not closed under substitutions. In this paper we give systems of annotated logics that are equivalent to those of Subrahmanian in the sense that everything provable in one type of system has a translation that is provable in the other. Moreover these new systems are structural. We prove that these systems are weakly congruential, namely, they have an infinite system of congruence 1-formulas. Moreover, we prove that an annotated logic is algebraizable (i.e., it has a finite system of congruence formulas,) if and only if the lattice of annotation constants is finite.Other Versions
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Citations of this work
Correspondences between Gentzen and Hilbert Systems.J. G. Raftery - 2006 - Journal of Symbolic Logic 71 (3):903 - 957.
Update to “A Survey of Abstract Algebraic Logic”.Josep Maria Font, Ramon Jansana & Don Pigozzi - 2009 - Studia Logica 91 (1):125-130.
Algebras and matrices for annotated logics.R. A. Lewin, I. F. Mikenberg & M. G. Schwarze - 2000 - Studia Logica 65 (1):137-153.
Algebraization of logics defined by literal-paraconsistent or literal-paracomplete matrices.Eduardo Hirsh & Renato A. Lewin - 2008 - Mathematical Logic Quarterly 54 (2):153-166.
XI Latin American Symposium on Mathematical Logic.Carlos Augusto Di Prisco - 1999 - Bulletin of Symbolic Logic 5 (4):495-524.
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