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概率测度的Wasserstein中位数

On the Wasserstein Median of Probability Measures

Journal of Computational and Graphical Statistics · 2024
被引 5 · 同刊同年前 10%
ABS 3

中文导读

本文提出Wasserstein中位数作为Wasserstein重心的一种稳健替代,证明了其存在性、一致性和稳健性,并给出迭代计算流程,适用于需要稳健中心趋势度量的场景。

Abstract

The primary choice to summarize a finite collection of random objects is by using measures of central tendency, such as mean and median. In the field of optimal transport, the Wasserstein barycenter corresponds to the Fréchet or geometric mean of a set of probability measures, which is defined as a minimizer of the sum of squared distances to each element in a given set with respect to the Wasserstein distance of order 2. We introduce the Wasserstein median as a robust alternative to the Wasserstein barycenter. The Wasserstein median corresponds to the Fréchet median under the 2 -Wasserstein metric. The existence and consistency of the Wasserstein median are first established, along with its robustness property. In addition, we present a general computational pipeline that employs any recognized algorithms for the Wasserstein barycenter in an iterative fashion and demonstrate its convergence. The utility of the Wasserstein median as a robust measure of central tendency is demonstrated using real and simulated data.

统计学最优传输概率测度计量经济学计算机科学