Topological duality and lattice expansions. I: A topological construction of canonical extensions.
From MaRDI portal
Publication:2449453
DOI10.1007/s00012-014-0267-2zbMath1307.06002OpenAlexW2047178405MaRDI QIDQ2449453
M. Andrew Moshier, Peter Jipsen
Publication date: 8 May 2014
Published in: Algebra Universalis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00012-014-0267-2
semilatticescanonical extensionsbounded latticesdual categoriesgeneral lattice dualitiestopological duality theorems
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (22)
Choice-free duality for orthocomplemented lattices by means of spectral spaces ⋮ CHOICE-FREE STONE DUALITY ⋮ Duality for normal lattice expansions and sorted residuated frames with relations ⋮ Topological duality and algebraic completions ⋮ A topological duality for dcpos ⋮ Positive modal logic beyond distributivity ⋮ Choice-free topological duality for implicative lattices and Heyting algebras ⋮ B-frame duality ⋮ Categorical Dualities for Some Two Categories of Lattices: An Extended Abstract ⋮ On the spectra of commutative semigroups ⋮ Unnamed Item ⋮ Unnamed Item ⋮ Topological duality and lattice expansions. II: Lattice expansions with quasioperators. ⋮ Reasoning with Incomplete Information in Generalized Galois Logics Without Distribution: The Case of Negation and Modal Operators ⋮ Algorithmic correspondence and canonicity for non-distributive logics ⋮ A categorical duality for semilattices and lattices ⋮ Canonical extensions and profinite completions of semilattices and lattices ⋮ Canonical extensions and ultraproducts of polarities ⋮ A topological duality for posets ⋮ A relational semantics for the logic of bounded lattices ⋮ A topological duality for monotone expansions of semilattices ⋮ REPRESENTING STRUCTURED SEMIGROUPS ON ÉTALE GROUPOID BUNDLES
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A topological representation of lattices
- A topological representation theory for lattices
- Duality for lattice-ordered algebras and for normal algebraizable logics
- The Pontryagin duality of compact O-dimensional semilattices and its applications
- Topological duality and lattice expansions. II: Lattice expansions with quasioperators.
- Continuous Lattices and Domains
- Representation of Distributive Lattices by means of ordered Stone Spaces
- The Theory of Representation for Boolean Algebras
- On a characterization of the lattice of all ideals of a Boolean ring
- Boolean Algebras with Operators. Part I
- Bounded lattice expansions
This page was built for publication: Topological duality and lattice expansions. I: A topological construction of canonical extensions.
