Predictive Quantile Regression with High-Dimensional Predictors: The Variable Screening Approach
Abstract
This paper advances a variable screening approach to enhance conditional quantile forecasts using high-dimensional predictors. We have refined and augmented the quantile partial correlation (QPC)-based variable screening proposed by Ma et al. (2017) to accommodate -mixing time-series data. Our approach is inclusive of i.i.d scenarios but introduces new convergence bounds for time-series contexts, suggesting the performance of QPC-based screening is influenced by the degree of time-series dependence. Through Monte Carlo simulations, we validate the effectiveness of QPC under weak dependence. Our empirical assessment of variable selection for growth-at-risk (GaR) forecasting underscores the method's advantages, revealing that specific labor market determinants play a pivotal role in forecasting GaR. While prior empirical research has predominantly considered a limited set of predictors, we employ the comprehensive Fred-QD dataset, retaining a richer breadth of information for GaR forecasts.
Keywords
Cite
@article{arxiv.2410.15097,
title = {Predictive Quantile Regression with High-Dimensional Predictors: The Variable Screening Approach},
author = {Hongqi Chen and Ji Hyung Lee},
journal= {arXiv preprint arXiv:2410.15097},
year = {2024}
}