Distributive laws for concept lattices
From MaRDI portal
Publication:1312172
DOI10.1007/BF01195382zbMath0795.06006OpenAlexW2101365774MaRDI QIDQ1312172
Publication date: 19 January 1994
Published in: Algebra Universalis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01195382
Complete distributivity (06D10) Complete lattices, completions (06B23) Structure and representation theory of distributive lattices (06D05) Galois correspondences, closure operators (in relation to ordered sets) (06A15)
Related Items
Frink quasicontinuous posets, Completely precontinuous posets., Unnamed Item, Prime ideals in 0-distributive posets, Ideals in atomic posets, The zerodivisor graph of a qoset, Negations and contrapositions of complete lattices, Unnamed Item, Unnamed Item, A completion-invariant extension of the concept of meet continuous lattices, General Stone duality., The Dedekind-MacNeille completion as a reflector, A Context-Based Description of the Doubly Founded Concept Lattices in the Variety Generated by M 3, On extensions of ideals in posets, Generalized pattern extraction from concept lattices, Regularity vs. constructive complete (co)distributivity, On \(n\)-normal posets, On Primary Ideals in Posets, An algebra of human concept learning, Unnamed Item, Unnamed Item, Forbidden configurations for distributive, modular and semidistributive posets, On Beck's coloring of posets, Unnamed Item, Hypercontinuous posets., Tensor products of contexts and complete lattices
Cites Work
- Coproducts of bounded \((\alpha,\beta)\)-distributive lattices
- Verbandstheoretische Kennzeichnung vollständiger Mengenringe
- Subdirect decomposition of concept lattices
- Distributive Cauchy lattices
- Standard completions for quasiordered sets
- M-distributive lattices
- Tensorial decomposition of concept lattices
- On finite lattices generated by their doubly irreducible elements
- Regularity and complete distributivity
- The Dedekind-MacNeille completion as a reflector
- Bigeneration in complete lattices and principal separation in ordered sets
- Regular elements of the semigroup of all binary relations
- Distributive partially ordered sets
- Regular Embeddings which Preserve Lattice Structure
- Ordered Topological Spaces and the Representation of Distributive Lattices
- Partially Ordered Sets
- Completely Distributive Complete Lattices
- A Subdirect-Union Representation for Completely Distributive Complete Lattices
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
