Title of article
Grouping fuzzy sets by similarity
Author/Authors
Radim Belohlavek، نويسنده , , Michal Krupka، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
6
From page
2656
To page
2661
Abstract
The paper presents results on factorization of systems of fuzzy sets. The factorization consists in grouping those fuzzy sets which are pairwise similar at least to a prescribed degree a. An obstacle to such factorization, well known in fuzzy set theory, is the fact that “being similar at least to degree a” is not an equivalence relation because, in general, it is not transitive. As a result, ordinary factorization using equivalence classes cannot be used. This obstacle can be overcome by considering maximal blocks of fuzzy sets which are pairwise similar at least to degree a. We show that one can introduce a natural complete lattice structure on the set of all such maximal blocks and study this lattice. This lattice plays the role of a factor structure for the original system of fuzzy sets. Particular examples of our approach include factorization of fuzzy concept lattices and factorization of residuated lattices.
Keywords
Fuzzy Logic , Residuated lattice , closure operator , Similarity
Journal title
Information Sciences
Serial Year
2009
Journal title
Information Sciences
Record number
1213689
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