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Gödel algebras free over finite distributive lattices
Annals of Pure and Applied Logic 155 (3):183-193 (2008)
Abstract
Gödel algebras form the locally finite variety of Heyting algebras satisfying the prelinearity axiom =. In 1969, Horn proved that a Heyting algebra is a Gödel algebra if and only if its set of prime filters partially ordered by reverse inclusion–i.e. its prime spectrum–is a forest. Our main result characterizes Gödel algebras that are free over some finite distributive lattice by an intrisic property of their spectral forestOther Versions
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Citations of this work
Tarski's theorem on intuitionistic logic, for polyhedra.Nick Bezhanishvili, Vincenzo Marra, Daniel McNeill & Andrea Pedrini - 2018 - Annals of Pure and Applied Logic 169 (5):373-391.
Locally Tabular $$ne $$ Locally Finite.Sérgio Marcelino & Umberto Rivieccio - 2017 - Logica Universalis 11 (3):383-400.
References found in this work
A sheaf representation and duality for finitely presented Heyting algebras.Silvio Ghilardi & Marek Zawadowski - 1995 - Journal of Symbolic Logic 60 (3):911-939.
Computing coproducts of finitely presented Gödel algebras.Ottavio M. D’Antona & Vincenzo Marra - 2006 - Annals of Pure and Applied Logic 142 (1):202-211.
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