BRIDGING CENTRALITY AND EXTREMITY: REFINING EMPIRICAL DATA DEPTH USING EXTREME VALUE STATISTICS

Article

Einmahl, John H. J.; Li, Jun; Lui, Regina Y.

Tilburg University; University of California System; University of California Riverside; Rutgers University System; Rutgers University New Brunswick

ANNALS OF STATISTICS

0090-5364

10.1214/15-AOS1359

2015

2738-2765

Statistical depth measures the centrality of a point with respect to a given distribution or data cloud. It provides a natural center-outward ordering of multivariate data points and yields a systematic nonparametric multivariate analysis scheme. In particular, the half-space depth is shown to have many desirable properties and broad applicability. However, the empirical half-space depth is zero outside the convex hull of the data. This property has rendered the empirical half-space depth useless outside the data cloud, and limited its utility in applications where the extreme outlying probability mass is the focal point, such as in classification problems and control charts with very small false alarm rates. To address this issue, we apply extreme value statistics to refine the empirical half-space depth in the tail. This provides an important linkage between data depth, which is useful for inference on centrality, and extreme value statistics, which is useful for inference on extremity. The refined empirical half-space depth can thus extend all its utilities beyond the data cloud, and hence broaden greatly its applicability. The refined estimator is shown to have substantially improved upon the empirical estimator in theory and simulations. The benefit of this improvement is also demonstrated through the applications in classification and statistical process control.