切片平均方差估计的核方法的强一致性

IF 0.6 4区 数学 Q4 STATISTICS & PROBABILITY
Emmanuel De Dieu Nkou
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引用次数: 0

摘要

摘要在本文中,我们考虑了核方法来估计切片平均方差估计(SAVE)。SAVE是一种称为SIR(切片逆回归)的工具,建议用于识别和估计中心降维(CDR)子空间。CDR子空间是所有降维子空间的交集,在给定维度预测向量X的情况下,这些降维子区域在描述响应Y的条件分布的基础上。SAVE甚至SIR用于估计CDR子空间。有两个版本非常流行:切片版本和内核版本。在本文中,我们关注的是内核版本。对于核SAVE版本,特别证明了两个渐近性质:渐近正态性和概率收敛性。我们知道,这两个性质虽然很重要,但在几乎肯定的收敛面前是弱的。然而,到目前为止,还没有获得强烈的一致性。在本文中,我们在较弱的假设下得到了这个渐近性质。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Strong consistency of kernel method for sliced average variance estimation
Abstract In this paper, we consider the kernel method to estimate sliced average variance estimation (SAVE). SAVE is a tool as SIR (sliced inverse regression), recommended to identify and to estimate the central dimension reduction (CDR) subspace. CDR subspace is the intersection of all dimension reduction subspaces which are at the base to describe the conditional distribution of the response Y given a dimensional predictor vector X. SAVE and even SIR are used to estimate CDR subspace. Two versions are very popular: slice version and kernel version. In this paper, we are looking at the kernel version. For Kernel SAVE version, two asymptotic properties have been demonstrated in particular: asymptotic normality and convergence in probability. And we know that these two properties, although important, are weak in front of almost sure convergence. However, until now, the strong consistency has not yet been obtained. In this paper, we obtain, under weaker assumptions, this asymptotic property.
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来源期刊
CiteScore
2.00
自引率
12.50%
发文量
320
审稿时长
7.5 months
期刊介绍: The Theory and Methods series intends to publish papers that make theoretical and methodological advances in Probability and Statistics. New applications of statistical and probabilistic methods will also be considered for publication. In addition, special issues dedicated to a specific topic of current interest will also be published in this series periodically, providing an exhaustive and up-to-date review of that topic to the readership.
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