Estimation of value-at-risk by $$L^{p}$$ quantile regression

IF 0.8 4区 数学 Q3 STATISTICS & PROBABILITY Annals of the Institute of Statistical Mathematics Pub Date : 2024-09-19 DOI:10.1007/s10463-024-00911-y
Peng Sun, Fuming Lin, Haiyang Xu, Kaizhi Yu
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Abstract

Exploring more accurate estimates of financial value at risk (VaR) has always been an important issue in applied statistics. To this end either quantile or expectile regression methods are widely employed at present, but an accumulating body of research indicates that \(L^{p}\) quantile regression outweighs both quantile and expectile regression in many aspects. In view of this, the paper extends \(L^{p}\) quantile regression to a general classical nonlinear conditional autoregressive model and proposes a new model called the conditional \(L^{p}\) quantile nonlinear autoregressive regression model (CAR-\(L^{p}\)-quantile model for short). Limit theorems for regression estimators are proved in mild conditions, and algorithms are provided for obtaining parameter estimates and the optimal value of p. Simulation study of estimation’s quality is given. Then, a CLVaR method calculating VaR based on the CAR-\(L^{p}\)-quantile model is elaborated. Finally, a real data analysis is conducted to illustrate virtues of our proposed methods.

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用 $$L^{p}$$ 量化回归估算风险价值
探索更准确的金融风险价值(VaR)估计值一直是应用统计中的一个重要问题。为此,目前广泛采用的是量化回归法或期望回归法,但不断积累的研究表明,\(L^{p}\) 量化回归法在很多方面优于量化回归法和期望回归法。有鉴于此,本文将 \(L^{p}\) 量化回归扩展到一般的经典非线性条件自回归模型,并提出了一种新的模型,即条件 \(L^{p}\) 量化非线性自回归模型(简称 CAR-\(L^{p}\)-quantile 模型)。在温和条件下证明了回归估计器的极限定理,并提供了获得参数估计和 p 最佳值的算法。然后,阐述了基于 CAR-\(L^{p}\)-quantile 模型计算风险价值的 CLVaR 方法。最后,通过实际数据分析来说明我们提出的方法的优点。
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来源期刊
CiteScore
2.00
自引率
0.00%
发文量
39
审稿时长
6-12 weeks
期刊介绍: Annals of the Institute of Statistical Mathematics (AISM) aims to provide a forum for open communication among statisticians, and to contribute to the advancement of statistics as a science to enable humans to handle information in order to cope with uncertainties. It publishes high-quality papers that shed new light on the theoretical, computational and/or methodological aspects of statistical science. Emphasis is placed on (a) development of new methodologies motivated by real data, (b) development of unifying theories, and (c) analysis and improvement of existing methodologies and theories.
期刊最新文献
Estimation of value-at-risk by $$L^{p}$$ quantile regression Simplified quasi-likelihood analysis for a locally asymptotically quadratic random field Asymptotic expected sensitivity function and its applications to measures of monotone association Penalized estimation for non-identifiable models Hidden AR process and adaptive Kalman filter
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