SánchezDaniel scite author profile

SánchezDaniel

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University of Granada

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An extended characterization of fuzzy bags

DelgadoMiguel

Martín-BautistaMaría-José

SánchezDaniel

et al. 2009

Int. J. Intell. Syst.

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The algebraic structures known as bags were introduced by R. Yager as set-like algebraic structures where elements are allowed to be repeated. Since the original papers by Yager, different definitions of the concept of fuzzy bag, and the corresponding operators, are available in the literature, as well as some extensions of the union, intersection and difference operators of sets, and new algebraic operators.In general, the current definitions of bag pose very interesting issues related to the ontological aspects and practical use of bags. In this paper, we introduce a characterization of bags viewing them as the result of a count operation on the basis of a mathematical correspondence. We also discuss on the extension of our alternative characterization of bags to the fuzzy case. On these basis, we introduce some operators on bags and fuzzy bags, and we compare them to existing approaches. Finally, we deal with the case where no information about the correspondence is available, and only bounds can be provided for the count of elements of the result of algebraic operators. For this purpose, the notion of IC-bag (Chakrabarty, in: Proc.

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International journal of intelligent systems: Special issue on “fuzzy bags, cardinality, and quantification”

DelgadoMiguel

SánchezDaniel

VilaMaría-Amparo

2009

Int. J. Intell. Syst.

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Fuzzy cardinality concerns the assessment of the number of elements in a fuzzy set. There are different approaches to fuzzy cardinality, dating back to the early works of Zadeh, De Luca and Termini, Dubois and Prade, and Wygralak, among others. But the most important ones can be classified into scalar and fuzzy approaches. The first one yields a scalar number (either integer or real) as the result, whereas the second one represents the cardinality of a fuzzy set as a fuzzy subset of the nonnegative integers.The cardinality of a fuzzy set is on the basis of two other important issues in fuzzy sets: fuzzy bags and fuzzy quantification. Bags (also called multisets) are algebraic set-like structures that allow for repeated elements. Usually, this information is summarized as a set of pairs (item, number of times it appears). Fuzzy bags where introduced by Yager as fuzzy extensions of the notion of bag in which each element can appear more than once, with different degrees. To obtain the summary, a measure of the fuzzy cardinality of the set of instances of each element is needed.Fuzzy quantifiers represent imprecise quantities or percentages, such as "approximately between 4 and 6," "around 20%," or "most." They generalize the usual "exists" and "forall" quantifiers of first-order logic, allowing us to represent the meaning of expressions like "Most of the students are tall." The evaluation of such quantified sentences requires determining the compatibility degree between the cardinality of the fuzzy set of young students and the linguistic quantifier "most." Early approaches to this problem are due to Zadeh, Dubois and Prade, Yager, and Sugeno, among others.Fuzzy cardinality and the closely related issues of fuzzy bags and fuzzy quantification are on the basis of many basic operations associated to most of the more important and promising areas of application of fuzzy sets. A few of them are

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SánchezDaniel

An extended characterization of fuzzy bags

International journal of intelligent systems: Special issue on “fuzzy bags, cardinality, and quantification”

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