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Priestley Style Duality for Distributive Meet-semilattices
Studia Logica 98 (1-2):83-122 (2011)
Abstract
We generalize Priestley duality for distributive lattices to a duality for distributive meet-semilattices. On the one hand, our generalized Priestley spaces are easier to work with than Celani’s DS-spaces, and are similar to Hansoul’s Priestley structures. On the other hand, our generalized Priestley morphisms are similar to Celani’s meet-relations and are more general than Hansoul’s morphisms. As a result, our duality extends Hansoul’s duality and is an improvement of Celani’s dualityAuthor's Profile
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Citations of this work
Hilbert Algebras with a Modal Operator $${\Diamond}$$ ◊.Sergio A. Celani & Daniela Montangie - 2015 - Studia Logica 103 (3):639-662.
Intermediate Logics Admitting a Structural Hypersequent Calculus.Frederik M. Lauridsen - 2019 - Studia Logica 107 (2):247-282.
On the free implicative semilattice extension of a Hilbert algebra.Sergio A. Celani & Ramon Jansana - 2012 - Mathematical Logic Quarterly 58 (3):188-207.
Leo Esakia on Duality in Modal and Intuitionistic Logics.Guram Bezhanishvili (ed.) - 2014 - Dordrecht, Netherland: Springer.
On intermediate inquisitive and dependence logics: An algebraic study.Davide Emilio Quadrellaro - 2022 - Annals of Pure and Applied Logic 173 (10):103143.
References found in this work
Topological Representations of Distributive Lattices and Brouwerian Logics.M. H. Stone - 1938 - Journal of Symbolic Logic 3 (2):90-91.
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