Gómez González, DanielRojas Patuelli, KarinaMontero De Juan, Francisco JavierRodríguez González, Juan Tinguaro2023-06-192023-06-192013Gomez, D., Rojas, K., Montero, J., Rodríguez, J.T.: Consistency and Stability in Aggregation Operators: An Application to Missing Data Problems. En: Bustince, H., Fernandez, J., Mesiar, R., y Calvo, T. (eds.) Aggregation Functions in Theory and in Practise. pp. 507-518. Springer Berlin Heidelberg, Berlin, Heidelberg (2013)978-3-642-39164-410.1007/978-3-642-39165-1_48https://hdl.handle.net/20.500.14352/35715Proceedings of the 7th International Summer School on Aggregation Operators at the Public University of Navarra, Pamplona, Spain, July 16-20, 2013In this work we analyze the key issue of the relationship that should hold between the operators in a family {An} of aggregation operators in order to understand they properly define a consistent whole. Here we extend some of the ideas about stability of a family of aggregation operators into a more general framework, formally defining the notions of i – L and j – R strict stability for families of aggregation operators. The notion of strict stability of order k is introduced as well. Finally, we also present an application of the strict stability conditions to deal with missing data problems in an information aggregation process. For this analysis, we have focused in the weighted mean family and the quasi-arithmetic weighted means families.engbook parthttps//doi.org/10.1007/978-3-642-39165-1_48http://link.springer.com/chapter/10.1007/978-3-642-39165-1_48open access510.64Aggregation operatorsStabilityMissing dataSelf-identityFuzzy setsLógica simbólica y matemática (Matemáticas)1102.14 Lógica Simbólica