Robust Estimation of Transition Matrices in High Dimensional Heavy-tailed Vector Autoregressive Processes.

JMLR workshop and conference proceedings Pub Date : 2015-07-01

Huitong Qiu, Sheng Xu, Fang Han, Han Liu, Brian Caffo

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Abstract

Gaussian vector autoregressive (VAR) processes have been extensively studied in the literature. However, Gaussian assumptions are stringent for heavy-tailed time series that frequently arises in finance and economics. In this paper, we develop a unified framework for modeling and estimating heavy-tailed VAR processes. In particular, we generalize the Gaussian VAR model by an elliptical VAR model that naturally accommodates heavy-tailed time series. Under this model, we develop a quantile-based robust estimator for the transition matrix of the VAR process. We show that the proposed estimator achieves parametric rates of convergence in high dimensions. This is the first work in analyzing heavy-tailed high dimensional VAR processes. As an application of the proposed framework, we investigate Granger causality in the elliptical VAR process, and show that the robust transition matrix estimator induces sign-consistent estimators of Granger causality. The empirical performance of the proposed methodology is demonstrated by both synthetic and real data. We show that the proposed estimator is robust to heavy tails, and exhibit superior performance in stock price prediction.

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高维重尾向量自回归过程中转移矩阵的鲁棒估计。

高斯向量自回归(VAR)过程在文献中得到了广泛的研究。然而，对于金融和经济中经常出现的重尾时间序列，高斯假设是严格的。在本文中，我们开发了一个统一的框架来建模和估计重尾VAR过程。特别地，我们将高斯VAR模型推广为自然适应重尾时间序列的椭圆VAR模型。在此模型下，我们开发了基于分位数的VAR过程过渡矩阵鲁棒估计器。我们证明了所提出的估计器在高维上达到了参数收敛速率。这是分析重尾高维VAR过程的第一次工作。作为该框架的应用，我们研究了椭圆VAR过程中的Granger因果关系，并证明了鲁棒转移矩阵估计量可以导出格兰杰因果关系的符号一致估计量。综合数据和实际数据都证明了所提出方法的经验性能。结果表明，该估计器对重尾具有较强的鲁棒性，在股票价格预测中表现出较好的性能。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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JMLR workshop and conference proceedings

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