MINIMAX ESTIMATION OF SMOOTH DENSITIES IN WASSERSTEIN DISTANCE
成果类型:
Article
署名作者:
Niles-Weed, Jonathan; Berthet, Quentin
署名单位:
New York University; Alphabet Inc.; Google Incorporated
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/21-AOS2161
发表日期:
2022
页码:
1519-1540
关键词:
optimal transport
CONVERGENCE
speed
摘要:
We study nonparametric density estimation problems where error is measured in the Wasserstein distance, a metric on probability distributions popular in many areas of statistics and machine learning. We give the first minimax-optimal rates for this problem for general Wasserstein distances for two classes of densities: smooth probability densities on [0, 1](d) bounded away from 0, and sub-Gaussian densities lying in the Holder class C-s, s is an element of (0, 1). Unlike classical nonparametric density estimation, these rates depend on whether the densities in question are bounded below, even in the compactly supported case. Motivated by variational problems involving the Wasserstein distance, we also show how to construct discretely supported measures, suitable for computational purposes, which achieve the minimax rates. Our main technical tool is an inequality giving a nearly tight dual characterization of the Wasserstein distances in terms of Besov norms.