高维正则分位数回归的全局和局部最优分析:一种次梯度方法

IF 1 4区 经济学 Q3 ECONOMICS
Lan Wang, Xuming He
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引用次数: 7

摘要

正则分位数回归(QR)是一种在高维潜在重尾误差污染下分析异质数据的有用技术。当协变量数大于样本量时,本文对$L_1$-正则化QR(QR-LASSO)的全局解和非凸正则化QR的局部解的估计/预测误差界进行了新的分析。我们的结果建立在文献中早期工作的基础上,并对其进行了显著的推广。对于某些重尾误差分布和一类一般的设计矩阵,无论调谐参数的选择如何,基于最小二乘法的LASSO都无法实现在正态性假设下导出的近似预言率。相反,我们确定QR-LASSO在比文献中更弱的条件下,对一大类模型实现了接近预言的估计错误率。对于QR-NCP,我们建立了一个新的结果,即在可行区域内的所有局部最优都具有期望的估计精度。我们的分析不仅适用于文献中常用的硬稀疏性设置,也适用于允许许多小系数的软稀疏性设置。我们的方法依赖于使用广义Karush–Kuhn–Tucker条件通过子梯度对正则化QR的全局/局部解的统一刻画。本文的理论建立了高维分位数损失函数的次微分的一个关键性质,它对分析其他高维非光滑问题具有独立的意义。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
ANALYSIS OF GLOBAL AND LOCAL OPTIMA OF REGULARIZED QUANTILE REGRESSION IN HIGH DIMENSIONS: A SUBGRADIENT APPROACH
Regularized quantile regression (QR) is a useful technique for analyzing heterogeneous data under potentially heavy-tailed error contamination in high dimensions. This paper provides a new analysis of the estimation/prediction error bounds of the global solution of $L_1$ -regularized QR (QR-LASSO) and the local solutions of nonconvex regularized QR (QR-NCP) when the number of covariates is greater than the sample size. Our results build upon and significantly generalize the earlier work in the literature. For certain heavy-tailed error distributions and a general class of design matrices, the least-squares-based LASSO cannot achieve the near-oracle rate derived under the normality assumption no matter the choice of the tuning parameter. In contrast, we establish that QR-LASSO achieves the near-oracle estimation error rate for a broad class of models under conditions weaker than those in the literature. For QR-NCP, we establish the novel results that all local optima within a feasible region have desirable estimation accuracy. Our analysis applies to not just the hard sparsity setting commonly used in the literature, but also to the soft sparsity setting which permits many small coefficients. Our approach relies on a unified characterization of the global/local solutions of regularized QR via subgradients using a generalized Karush–Kuhn–Tucker condition. The theory of the paper establishes a key property of the subdifferential of the quantile loss function in high dimensions, which is of independent interest for analyzing other high-dimensional nonsmooth problems.
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来源期刊
Econometric Theory
Econometric Theory MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-STATISTICS & PROBABILITY
CiteScore
1.90
自引率
0.00%
发文量
52
审稿时长
>12 weeks
期刊介绍: Since its inception, Econometric Theory has aimed to endow econometrics with an innovative journal dedicated to advance theoretical research in econometrics. It provides a centralized professional outlet for original theoretical contributions in all of the major areas of econometrics, and all fields of research in econometric theory fall within the scope of ET. In addition, ET fosters the multidisciplinary features of econometrics that extend beyond economics. Particularly welcome are articles that promote original econometric research in relation to mathematical finance, stochastic processes, statistics, and probability theory, as well as computationally intensive areas of economics such as modern industrial organization and dynamic macroeconomics.
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