Resumen
We find the extreme points of the set of convex functions : [0, 1] → [0, 1] with a
fixed area and (0) = 0, (1) = 1. This collection is formed by Lorenz curves with a
given value of their Gini index. The analogous set of concave functions can be viewed
as Receiver Operating Characteristic (ROC) curves. These functions are extensively
used in economics (inequality and risk analysis) and machine learning (evaluation
of the performance of binary classifiers). We also compute the maximal L1-distance
between two Lorenz (or ROC) curves with specified Gini coefficients. This result
allows us to introduce a bidimensional index to compare two of such curves, in a more
informative and insightful manner than with the usual unidimensional measures
considered in the literature (Gini index or area under the ROC curve). The analysis
of real income microdata illustrates the practical use of this proposed index in
statistical inference.