分位数自回归条件异方差

Quantile autoregressive conditional heteroscedasticity

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2023
被引 5
ABS 4

中文导读

提出一种基于分位数回归过程的条件异方差时间序列模型,能刻画不同分位水平下的条件分位数结构,并针对厚尾分布和高分位估计精度问题引入自加权复合分位数回归估计量。

Abstract

Abstract This article proposes a novel conditional heteroscedastic time series model by applying the framework of quantile regression processes to the ARCH(∞) form of the GARCH model. This model can provide varying structures for conditional quantiles of the time series across different quantile levels, while including the commonly used GARCH model as a special case. The strict stationarity of the model is discussed. For robustness against heavy-tailed distributions, a self-weighted quantile regression (QR) estimator is proposed. While QR performs satisfactorily at intermediate quantile levels, its accuracy deteriorates at high quantile levels due to data scarcity. As a remedy, a self-weighted composite quantile regression estimator is further introduced and, based on an approximate GARCH model with a flexible Tukey-lambda distribution for the innovations, we can extrapolate the high quantile levels by borrowing information from intermediate ones. Asymptotic properties for the proposed estimators are established. Simulation experiments are carried out to access the finite sample performance of the proposed methods, and an empirical example is presented to illustrate the usefulness of the new model.

时间序列分析金融计量经济学分位数回归波动率建模