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  1. From semirings to residuated Kleene lattices.Peter Jipsen - 2004 - Studia Logica 76 (2):291 - 303.
    We consider various classes of algebras obtained by expanding idempotent semirings with meet, residuals and Kleene-*. An investigation of congruence properties (e-permutability, e-regularity, congruence distributivity) is followed by a section on algebraic Gentzen systems for proving inequalities in idempotent semirings, in residuated lattices, and in (residuated) Kleene lattices (with cut). Finally we define (one-sorted) residuated Kleene lattices with tests to complement two-sorted Kleene algebras with tests.
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  • Categorial Type Logics.Michael Moortgat - 1997 - In J. F. A. K. Van Benthem, Johan van Benthem & Alice G. B. Ter Meulen (eds.), Handbook of Logic and Language. Elsevier.
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  • The Mathematics of Sentence Structure.Joachim Lambek - 1958 - Journal of Symbolic Logic 65 (3):154-170.
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  • Mathematical linguistics and proof theory.Wojciech Buszkowski - 1997 - In J. F. A. K. Van Benthem, Johan van Benthem & Alice G. B. Ter Meulen (eds.), Handbook of Logic and Language. Elsevier. pp. 683--736.
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  • (1 other version)A truth value semantics for modal logic.J. Michael Dunn - 1973 - Journal of Symbolic Logic 42 (2):87--100.
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  • Algebraic aspects of cut elimination.Francesco Belardinelli, Peter Jipsen & Hiroakira Ono - 2004 - Studia Logica 77 (2):209 - 240.
    We will give here a purely algebraic proof of the cut elimination theorem for various sequent systems. Our basic idea is to introduce mathematical structures, called Gentzen structures, for a given sequent system without cut, and then to show the completeness of the sequent system without cut with respect to the class of algebras for the sequent system with cut, by using the quasi-completion of these Gentzen structures. It is shown that the quasi-completion is a generalization of the MacNeille completion. (...)
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