On the binomial decomposition of OWA functions, the 3-additive case in n dimensions
Working Paper 2015-360
Abstract
In the context of the binomial decomposition of OWA functions, we investigate the parametric constraints associated with the 3-additive case in n dimensions. The resulting feasible region in two coefficients is a convex polygon with n vertices and n edges, and is strictly increasing in the dimension n. The orness of the OWA functions within the feasible region is linear in the two coefficients, and the vertices associated with maximum and minimum orness are identified.
Authors: Silvia Bortot, Ricardo Alberto Marques Pereira, Thuy Nguyen.
Keywords: Generalized Gini welfare functions and inequality indices, symmetric capacities and Choquet integrals, OWA functions and orness, binomial decomposition and k-additivity.
JEL: D31, D63, I31.