On Fuzzy Generalizations of Concept Lattices
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Publication:5214099
DOI10.1007/978-3-319-74681-4_6zbMath1429.68268OpenAlexW2792864190MaRDI QIDQ5214099
Stanislav Krajči, Ondrej Krídlo, Lubomir Antoni
Publication date: 7 February 2020
Published in: Interactions Between Computational Intelligence and Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-319-74681-4_6
Cites Work
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- Minimal solutions of generalized fuzzy relational equations: probabilistic algorithm based on greedy approach
- Note on generating fuzzy concept lattices via Galois connections
- On possible generalization of fuzzy concept lattices using dually isomorphic retracts
- Triadic concept lattices in the framework of aggregation structures
- Attribute and size reduction mechanisms in multi-adjoint concept lattices
- On the definition of suitable orderings to generate adjunctions over an unstructured codomain
- Bipolar fuzzy graph representation of concept lattice
- Generalized one-sided concept lattices with attribute preferences
- Isotone fuzzy Galois connections with hedges
- Extending conceptualisation modes for generalised formal concept analysis
- The use of linguistic variables and fuzzy propositions in the \(L\)-fuzzy concept theory
- On the Dedekind-MacNeille completion and formal concept analysis based on multilattices
- On multi-adjoint concept lattices based on heterogeneous conjunctors
- A comparative study of adjoint triples
- Relating generalized concept lattices and concept lattices for non-commutative conjunctors
- On equivalence of conceptual scaling and generalized one-sided concept lattices
- Granularity of attributes in formal concept analysis
- Generalized random events
- A categorical approach to probability theory
- Formal concept analysis via multi-adjoint concept lattices
- Adjoint negations, more than residuated negations
- Possibility theory and formal concept analysis: characterizing independent sub-contexts
- Sup-t-norm and inf-residuum are one type of relational product: unifying framework and consequences
- Representation of fuzzy concept lattices in the framework of classical FCA
- Data mining and computational intelligence
- Similarity-based unification: A multi-adjoint approach
- Concept lattices and order in fuzzy logic
- A note on bipolar fuzzy graph representation of concept lattice
- Multi-adjoint concept lattices with heterogeneous conjunctors and hedges.
- Revising the link between \(L\)-Chu correspondences and completely lattice \(L\)-ordered sets.
- Application of the \(L\)-fuzzy concept analysis in the morphological image and signal processing
- Multi-adjoint t-concept lattices
- Description of sup- and inf-preserving aggregation functions via families of clusters in data tables
- On residuation in multilattices: filters, congruences, and homomorphisms.
- On heterogeneous formal contexts
- Ordinally equivalent data: a measurement-theoretic look at formal concept analysis of fuzzy attributes
- On stability of a formal concept
- Dual multi-adjoint concept lattices
- Formal concept analysis of higher order
- Formal concept analysis and linguistic hedges
- Basic Level of Concepts in Formal Concept Analysis
- OnL-fuzzy Chu correspondences
- A PARAMETERIZED ALGORITHM TO EXPLORE FORMAL CONTEXTS WITH A TAXONOMY
- Approaches to the Selection of Relevant Concepts in the Case of Noisy Data
- On Multi-adjoint Concept Lattices: Definition and Representation Theorem
- Fuzzy Galois Connections
- A general approach to fuzzy concepts
- Randomized Fuzzy Formal Contexts and Relevance of One-Sided Concepts
- On basic conditions to generate multi-adjoint concept lattices via Galois connections
- Formal Concept Analysis
- A Generalized Concept Lattice
- Galois Connexions
- Formal Concept Analysis
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