Combinatorial Depth Measures for Hyperplane Arrangements

TL;DR

This paper introduces and analyzes combinatorial depth measures for hyperplane arrangements, proving the existence of deep points, a Tverberg-type theorem, and new proofs of the centerpoint theorem for regression depth.

Contribution

It generalizes depth measures for hyperplanes, proves a Tverberg-type theorem, and provides stronger proofs of the centerpoint theorem for regression depth.

Findings

All depth measures have a deep point.

Established a Tverberg-type theorem for hyperplane arrangements.

Provided new, stronger proofs of the centerpoint theorem.

Abstract

Regression depth, introduced by Rousseeuw and Hubert in 1999, is a notion that measures how good of a regression hyperplane a given query hyperplane is with respect to a set of data points. Under projective duality, this can be interpreted as a depth measure for query points with respect to an arrangement of data hyperplanes. The study of depth measures for query points with respect to a set of data points has a long history, and many such depth measures have natural counterparts in the setting of hyperplane arrangements. For example, regression depth is the counterpart of Tukey depth. Motivated by this, we study general families of depth measures for hyperplane arrangements and show that all of them must have a deep point. Along the way we prove a Tverberg-type theorem for hyperplane arrangements, giving a positive answer to a conjecture by Rousseeuw and Hubert from 1999. We also get three new proofs of the centerpoint theorem for regression depth, all of which are either stronger or more general than the original proof by Amenta, Bern, Eppstein, and Teng. Finally, we prove a version of the center transversal theorem for regression depth.