Concept lattices and order in fuzzy logic

Annals of Pure and Applied Logic 128 (1-3):277-298 (2004)
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Abstract

The theory of concept lattices is approached from the point of view of fuzzy logic. The notions of partial order, lattice order, and formal concept are generalized for fuzzy setting. Presented is a theorem characterizing the hierarchical structure of formal fuzzy concepts arising in a given formal fuzzy context. Also, as an application of the present approach, Dedekind–MacNeille completion of a partial fuzzy order is described. The approach and results provide foundations for formal concept analysis of vague data—the propositions “object x has attribute y”, which form the input data to formal concept analysis, are now allowed to have also intermediate truth values, meeting reality better

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10.1016/j.apal.2003.01.001

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Citations of this work

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References found in this work

Fuzzy Sets.Lofti A. Zadeh - 1965 - Information and Control 8 (1):338--53.
Hüllensysteme und Erweiterung von Quasi‐Ordnungen.Bernhard Banaschewski - 1956 - Mathematical Logic Quarterly 2 (8‐9):117-130.
Hüllensysteme und Erweiterung von Quasi‐Ordnungen.Bernhard Banaschewski - 1956 - Mathematical Logic Quarterly 2 (8-9):117-130.
Fuzzy Galois Connections.Radim Bêlohlávek - 1999 - Mathematical Logic Quarterly 45 (4):497-504.

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