分位数回归模型及其应用综述

Q. Huang, Hanze Zhang, Jiaqing Chen, Mengying He
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引用次数: 71

摘要

近年来,分位数回归(QR)受到越来越多的关注,并在投资、金融、经济、医学和工程等领域得到了广泛的应用。与传统的均值回归相比,QR可以表征结果变量的整个条件分布,对异常值和误差分布的错误指定可能更具鲁棒性,并提供比传统均值回归更全面的统计建模。当违反正态性假设或存在异常值和长尾时,QR模型不仅可以用于检测结果的不同分位数处协变量的异质效应,而且与均值回归相比,还可以提供更稳健和完整的估计。这些优势使QR具有吸引力,并扩展应用于不同类型的数据,包括独立数据、事件时间数据和纵向数据。因此,我们简要回顾了QR及其在各种应用领域中针对不同类型数据的相关模型和方法。
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Quantile Regression Models and Their Applications: A Review
Quantile regression (QR) has received increasing attention in recent years and applied to wide areas such as investment, finance, economics, medicine and engineering. Compared with conventional mean regression, QR can characterize the entire conditional distribution of the outcome variable, may be more robust to outliers and misspecification of error distribution, and provides more comprehensive statistical modeling than traditional mean regression. QR models could not only be used to detect heterogeneous effects of covariates at different quantiles of the outcome, but also offer more robust and complete estimates compared to the mean regression, when the normality assumption violated or outliers and long tails exist. These advantages make QR attractive and are extended to apply for different types of data, including independent data, time-to-event data and longitudinal data. Consequently, we present a brief review of QR and its related models and methods for different types of data in various application areas.
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