多协变量下期望损失回归的稳健估计与推断

Robust estimation and inference for expected shortfall regression with many regressors

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2023
被引 11
ABS 4

中文导读

针对高维协变量下期望损失回归的数值难题,提出一种基于Neyman正交得分的两步法,兼顾稳健性、统计与计算效率,适用于厚尾数据。

Abstract

Abstract Expected shortfall (ES), also known as superquantile or conditional value-at-risk, is an important measure in risk analysis and stochastic optimisation and has applications beyond these fields. In finance, it refers to the conditional expected return of an asset given that the return is below some quantile of its distribution. In this paper, we consider a joint regression framework recently proposed to model the quantile and ES of a response variable simultaneously, given a set of covariates. The current state-of-the-art approach to this problem involves minimising a non-differentiable and non-convex joint loss function, which poses numerical challenges and limits its applicability to large-scale data. Motivated by the idea of using Neyman-orthogonal scores to reduce sensitivity to nuisance parameters, we propose a statistically robust and computationally efficient two-step procedure for fitting joint quantile and ES regression models that can handle highly skewed and heavy-tailed data. We establish explicit non-asymptotic bounds on estimation and Gaussian approximation errors that lay the foundation for statistical inference, even with increasing covariate dimensions. Finally, through numerical experiments and two data applications, we demonstrate that our approach well balances robustness, statistical, and numerical efficiencies for expected shortfall regression.

金融风险管理计量经济学统计推断稳健回归