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Representing ordered structures by fuzzy sets: an overview

✍ Scribed by Branimir Šešelja; Andreja Tepavčević

Publisher
Elsevier Science
Year
2003
Tongue
English
Weight
304 KB
Volume
136
Category
Article
ISSN
0165-0114

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✦ Synopsis

We present a survey on representations of ordered structures by fuzzy sets. Any poset satisfying some ÿniteness condition, semilattice, lattice belonging to a special class, e.g., distributive, Noetherian, complete and others-can be represented by a single function, i.e., by a fuzzy set. Its domain and co-domain are particular subsets of the same structure, and consist of irreducible elements. The representation is minimal in the sense that another representation could not be obtained by replacing the domain of the former by its proper subset. By this approach, the structure itself is uniquely represented by the collection of cuts ordered dually to inclusion.

📜 SIMILAR VOLUMES

Completion of ordered structures by cuts
Completion of ordered structures by cuts of fuzzy sets: an overview
✍ Branimir Šešelja; Andreja Tepavčević 📂 Article 📅 2003 🏛 Elsevier Science 🌐 English ⚖ 292 KB

The aim of the paper is to present a role of fuzzy sets in the theory of ordered structures. Main algebraic properties of cuts of fuzzy sets are given, and a completion of partially ordered sets to complete lattices is described. It turns out that this completion is equivalent with the famous Dedeki