id: 06111505
dt: a
an: 06111505
au: Gómez, Daniel; Montero, Javier; Rodríguez, J.Tinguaro; Rojas, Karina
ti: Stability in aggregation operators.
so: Greco, Salvatore (ed.) et al., Advances in computational intelligence. 14th
    international conference on information processing and management of
    uncertainty in knowledge-based systems, IPMU 2012, Catania, Italy, July
    9‒13, 2012. Proceedings, Part III. Berlin: Springer (ISBN
    978-3-642-31717-0/pbk; 978-3-642-31718-7/ebook). Communications in
    Computer and Information Science 299, 317-325 (2012).
py: 2012
pu: Berlin: Springer
la: EN
cc: 
ut: 
ci: 
li: doi:10.1007/978-3-642-31718-7_33
ab: Summary: Aggregation functions have been widely studied in the literature.
    Nevertheless, few efforts have been dedicated to analyze those
    properties related with the family of operators in a global way. In
    this work, we analyze the stability in a family of aggregation
    operators. The stability property for a family of aggregation operators
    tries to force a family to have a stable/continuous definition in the
    sense that the aggregation of $n-1$ items should be similar to the
    aggregation of $n$ items if the last item is the aggregation of the
    previous $n-1$ items. Following this idea, some definitions and results
    are given.
rv: