Exponential concentration for geometric-median-of-means in non-positive curvature spaces

IF 1.5 2区数学 Q2 STATISTICS & PROBABILITY

Bernoulli Pub Date : 2022-11-30 DOI:10.3150/22-BEJ1569

H. Yun, B. Park

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引用次数: 3

Abstract

In Euclidean spaces, the empirical mean vector as an estimator of the population mean is known to have polynomial concentration unless a strong tail assumption is imposed on the underlying probability measure. The idea of median-of-means tournament has been considered as a way of overcoming the sub-optimality of the empirical mean vector. In this paper, to address the sub-optimal performance of the empirical mean in a more general setting, we consider general Polish spaces with a general metric, which are allowed to be non-compact and of infinite-dimension. We discuss the estimation of the associated population Frechet mean, and for this we extend the existing notion of median-of-means to this general setting. We devise several new notions and inequalities associated with the geometry of the underlying metric, and using them we study the concentration properties of the extended notions of median-of-means as the estimators of the population Frechet mean. We show that the new estimators achieve exponential concentration under only a second moment condition on the underlying distribution, while the empirical Frechet mean has polynomial concentration. We focus our study on spaces with non-positive Alexandrov curvature since they afford slower rates of convergence than spaces with positive curvature. We note that this is the first work that derives non-asymptotic concentration inequalities for extended notions of the median-of-means in non-vector spaces with a general metric.

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非正曲率空间中几何均值的指数集中

在欧几里得空间中，经验均值向量作为总体均值的估计量已知具有多项式浓度，除非对潜在的概率度量施加强尾假设。中位数竞赛的思想被认为是克服经验均值向量次优性的一种方法。在本文中，为了解决经验均值在更一般的情况下的次优性能，我们考虑具有一般度量的一般波兰空间，它允许是非紧化和无限维。我们讨论了相关总体Frechet均值的估计，为此，我们将现有的均值中位数概念扩展到这种一般设置。我们设计了几个与基础度量几何相关的新概念和不等式，并利用它们研究了作为总体Frechet均值估计量的扩展中位数概念的集中特性。我们证明了新的估计量在底层分布上仅在二阶矩条件下达到指数集中，而经验Frechet平均值具有多项式集中。我们主要研究非正亚历山德罗夫曲率空间，因为它们的收敛速度比正曲率空间慢。我们注意到，这是第一个导出非向量空间中具有一般度量的中位数扩展概念的非渐近集中不等式的工作。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Bernoulli 数学-统计学与概率论

CiteScore

3.40

自引率

0.00%

发文量

116

审稿时长

6-12 weeks

期刊介绍： BERNOULLI is the journal of the Bernoulli Society for Mathematical Statistics and Probability, issued four times per year. The journal provides a comprehensive account of important developments in the fields of statistics and probability, offering an international forum for both theoretical and applied work. BERNOULLI will publish: Papers containing original and significant research contributions: with background, mathematical derivation and discussion of the results in suitable detail and, where appropriate, with discussion of interesting applications in relation to the methodology proposed. Papers of the following two types will also be considered for publication, provided they are judged to enhance the dissemination of research: Review papers which provide an integrated critical survey of some area of probability and statistics and discuss important recent developments. Scholarly written papers on some historical significant aspect of statistics and probability.