Multivariate Brenier cumulative distribution functions and their application to non-parametric testing
Statistics Theory
2018-09-13 v1 Statistics Theory
Abstract
In this work we introduce a novel approach of construction of multivariate cumulative distribution functions, based on cyclical-monotone mapping of an original measure to some target measure , supported on a convex compact subset of . This map is referred to as -Brenier distribution function (-BDF), whose counterpart under the one-dimensional setting is an ordinary CDF, with selected as , a uniform distribution on . Following one-dimensional frame-work, a multivariate analogue of Glivenko-Cantelli theorem is provided. A practical applicability of the theory is then illustrated by the development of a non-parametric pivotal two-sample test, that is rested on -Wasserstein distance.
Cite
@article{arxiv.1809.04090,
title = {Multivariate Brenier cumulative distribution functions and their application to non-parametric testing},
author = {Melf Boeckel and Vladimir Spokoiny and Alexandra Suvorikova},
journal= {arXiv preprint arXiv:1809.04090},
year = {2018}
}
Comments
19 pages, 2 figures