Artículo de revista
Distance measures, weighted averages, OWA operators and Bonferroni means
Fecha
2017Registro en:
Applied Soft Computing 50 (2017) 356–366
15684946
10.1016/j.asoc.2016.11.024
Autor
Merigó Lindahl, José
Palacios Marqués, Daniel
Soto Acosta, Pedro
Institución
Resumen
The ordered weighted average (OWA) is an aggregation operator that provides a parameterized family of operators between the minimum and the maximum. This paper presents the OWA weighted average distance operator. The main advantage of this new approach is that it unifies the weighted Hamming distance and the OWA distance in the same formulation and considering the degree of importance that each concept has in the analysis. This operator includes a wide range of particular cases from the minimum to the maximum distance. Some further generalizations are also developed with generalized and quasi-arithmetic means. The use of Bonferroni means under this framework is also studied. The paper ends with an application of the new approach in a group decision making problem with Dempster-Shafer belief structure regarding the selection of strategies.