International audienceThe axioms that characterize the generalized Gini social evaluation orderings for one-dimensional distributions are extended to the multidimensional attributes case. A social evaluation ordering is shown to have a two-stage aggregation representation if these axioms and a separability assumption are satisfied. In the first stage, the distributions of each attribute are aggregated using generalized Gini social evaluation functions. The functional form of the second-stage aggregator depends on the number of attributes and on which version of a comonotonic additivity axiom is used. The implications of these results for the corresponding multidimensional indices of relative and absolute inequality are also considered
Accepted Author Manuscript (peer reviewed) This is the final text version of the article, and it may...
This paper provides an axiomatization of linear inequality measures representing binary relations on...
This article considers the ranking of profiles of opportunity sets on the basis of their equality. A...
International audienceThe axioms that characterize the generalized Gini social evaluation orderings ...
For the comparison of inequality and welfare in multiple attributes the use of generalized Gini indi...
We propose to measure inequality of well-being with a multidimensional generalization of the Gini co...
We review results concerning the representation of partial orders of univariate distributions via st...
We propose to measure inequality of well-being with a multidimensional generalization of the Gini co...
We propose to measure inequality of well-being with a multidimensional generalization of the Gini co...
This paper deals with the axiomatic derivation of social evaluation indices in a multidimensional co...
Two essential intuitions about the concept of multidimensional inequality have been highlighted in t...
This paper generalizes the axiomatic approach to the design of income inequality measures to the mul...
peer reviewedThis article axiomatically derives a class of numerical indices of integration (equalit...
Abstract. This article considers the ranking of profiles of opportunity sets on the basis of their e...
This article examines the use of the Gini Index for the measurement of the degree of inequality amon...
Accepted Author Manuscript (peer reviewed) This is the final text version of the article, and it may...
This paper provides an axiomatization of linear inequality measures representing binary relations on...
This article considers the ranking of profiles of opportunity sets on the basis of their equality. A...
International audienceThe axioms that characterize the generalized Gini social evaluation orderings ...
For the comparison of inequality and welfare in multiple attributes the use of generalized Gini indi...
We propose to measure inequality of well-being with a multidimensional generalization of the Gini co...
We review results concerning the representation of partial orders of univariate distributions via st...
We propose to measure inequality of well-being with a multidimensional generalization of the Gini co...
We propose to measure inequality of well-being with a multidimensional generalization of the Gini co...
This paper deals with the axiomatic derivation of social evaluation indices in a multidimensional co...
Two essential intuitions about the concept of multidimensional inequality have been highlighted in t...
This paper generalizes the axiomatic approach to the design of income inequality measures to the mul...
peer reviewedThis article axiomatically derives a class of numerical indices of integration (equalit...
Abstract. This article considers the ranking of profiles of opportunity sets on the basis of their e...
This article examines the use of the Gini Index for the measurement of the degree of inequality amon...
Accepted Author Manuscript (peer reviewed) This is the final text version of the article, and it may...
This paper provides an axiomatization of linear inequality measures representing binary relations on...
This article considers the ranking of profiles of opportunity sets on the basis of their equality. A...