Special fuzzy measures on infinite countable sets and related aggregation functions

While both additive and symmetric fuzzy measures on a finite universe are completely described by a probability distribution vector, this is no more the case of a countably infinite universe. After a brief discussion of additive fuzzy measures on positive integers, we characterize all symmetric fuzz...

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Veröffentlicht in:	Fuzzy sets and systems Jg. 167; H. 1; S. 57 - 64
1. Verfasser:	STUPNANOVA, Andrea
Format:	Journal Article Tagungsbericht
Sprache:	Englisch
Veröffentlicht:	Kidlington Elsevier B.V 30.03.2011 Elsevier
Schlagworte:	Additive fuzzy measure Applied sciences Choquet integral Circuit properties Computer science; control theory; systems Digital circuits Electric, optical and optoelectronic circuits Electronic circuits Electronics Exact sciences and technology Fuzzy Fuzzy logic Fuzzy set theory Information, signal and communications theory Integers k-Order additivity Mathematical analysis Mathematical methods Mathematics Measure and integration Miscellaneous Operators OWA operator p-Symmetry Sciences and techniques of general use Symmetric fuzzy measure Telecommunications and information theory Theoretical computing Universe Vectors (mathematics) Symmetric fuzzy measure k-Order additivity OWA operator Choquet integral p-Symmetry Additive fuzzy measure Integer Fuzzy system Information processing Probability distribution Fuzzy set
ISSN:	0165-0114, 1872-6801
Online-Zugang:	Volltext
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Zusammenfassung:	While both additive and symmetric fuzzy measures on a finite universe are completely described by a probability distribution vector, this is no more the case of a countably infinite universe. After a brief discussion of additive fuzzy measures on positive integers, we characterize all symmetric fuzzy measures on integers by means of three constants and of two probability distribution vectors. OWA operators for n arguments were introduced by Yager in 1988. Grabisch in 1995 has shown representation of OWA operators by means of Choquet integral with respect to symmetric normed capacities. Based on symmetric capacities on positive integers, we extend the concept of OWA operators to infinitary sequences and thus we develop the concept of infinitary OWA operators.
Bibliographie:	ObjectType-Article-2 SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 23
ISSN:	0165-0114 1872-6801
DOI:	10.1016/j.fss.2010.09.009