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|Title:||OWA Operators in Generalized Distances|
|Author:||Gil Lafuente, Anna Maria|
Merigó Lindahl, José M.
Presa de decisions
|Abstract:||Different types of aggregation operators such as the ordered weighted quasi-arithmetic mean (Quasi-OWA) operator and the normalized Hamming distance are studied. We introduce the use of the OWA operator in generalized distances such as the quasi-arithmetic distance. We will call these new distance aggregation the ordered weighted quasi-arithmetic distance (Quasi-OWAD) operator. We develop a general overview of this type of generalization and study some of their main properties such as the distinction between descending and ascending orders. We also consider different families of Quasi-OWAD operators such as the Minkowski ordered weighted averaging distance (MOWAD) operator, the ordered weighted averaging distance (OWAD) operator, the Euclidean ordered weighted averaging distance (EOWAD) operator, the normalized quasi-arithmetic distance, etc|
|Note:||Reproducció del document publicat a: https://waset.org/Publication/owa-operators-in-generalized-distances/15590|
|It is part of:||International Journal of Computer, Electrical, Automation, Control and Information Engineering, 2009, vol. 3, num. 9, p. 2277-2284|
|Appears in Collections:||Articles publicats en revistes (Empresa)|
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