Formal Concept Analysis [electronic resource] : 5th International Conference, ICFCA 2007, Clermont-Ferrand, France, February 12-16, 2007. Proceedings / edited by Sergei O. Kuznetsov, Stefan Schmidt.
Material type:![Text](/opac-tmpl/lib/famfamfam/BK.png)
- text
- computer
- online resource
- 9783540709015
- Computer science
- Software engineering
- Computational complexity
- Data mining
- Artificial intelligence
- Algebra
- Computer Science
- Artificial Intelligence (incl. Robotics)
- Discrete Mathematics in Computer Science
- Mathematical Logic and Formal Languages
- Software Engineering
- Data Mining and Knowledge Discovery
- Order, Lattices, Ordered Algebraic Structures
- 006.3 23
- Q334-342
- TJ210.2-211.495
Item type | Current library | Call number | Status | Date due | Barcode | |
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Central Library | Available | E-44139 |
Relational Galois Connections -- Semantology as Basis for Conceptual Knowledge Processing -- A New and Useful Syntactic Restriction on Rule Semantics for Tabular Datasets -- A Proposal for Combining Formal Concept Analysis and Description Logics for Mining Relational Data -- Computing Intensions of Digital Library Collections -- Custom Asymmetric Page Split Generalized Index Search Trees and Formal Concept Analysis -- The Efficient Computation of Complete and Concise Substring Scales with Suffix Trees -- A Parameterized Algorithm for Exploring Concept Lattices -- About the Lossless Reduction of the Minimal Generator Family of a Context -- Some Notes on Pseudo-closed Sets -- Performances of Galois Sub-hierarchy-building Algorithms -- Galois Connections Between Semimodules and Applications in Data Mining -- On Multi-adjoint Concept Lattices: Definition and Representation Theorem -- Base Points, Non-unit Implications, and Convex Geometries -- Lattices of Relatively Axiomatizable Classes -- A Solution of the Word Problem for Free Double Boolean Algebras -- On the MacNeille Completion of Weakly Dicomplemented Lattices -- Polynomial Embeddings and Representations -- The Basic Theorem on Labelled Line Diagrams of Finite Concept Lattices -- Bipartite Ferrers-Graphs and Planar Concept Lattices.
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