Abstract
Little known relations of the renown concept of the halfspace depth for multivariate data with notions from convex and affine geometry are discussed. Maximum halfspace depth may be regarded as a measure of symmetry for random vectors. As such, the maximum depth stands as a generalization of a measure of symmetry for convex sets, well studied in geometry. Under a mild assumption, the upper level sets of the halfspace depth coincide with the convex floating bodies of measures used in the definition of the affine surface area for convex bodies in Euclidean spaces. These connections enable us to partially resolve some persistent open problems regarding theoretical properties of the depth.
Highlights
Halfspace depth and floating body are the same concept
The first is extensively studied in nonparametric statistics, the second is of great importance in convex geometry
Work on data depth has not been recognized by the convex geometry community, and that in convex geometry not by researchers in statistics
Summary
Halfspace depth and floating body are the same concept. The first is extensively studied in nonparametric statistics, the second is of great importance in convex geometry. Work on data depth has not been recognized by the convex geometry community, and that in convex geometry not by researchers in statistics. There is an abundance of results common to both fields. We want to explore and summarize here what is common to both fields, what is known and what is not known. Data depth is a generalization of order statistics and ranks to multivariate random variables. For a multivariate probability distribution, to devise a distribution-specific ranking of points in the sample space. The concept of floating body was used, among other things, to introduce the affine surface area to all convex bodies. It provides solutions to many problems where ellipsoids are extrema
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