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Automated Estimation of Heavy-tailed Vector Error Correction Models

  • Speaker: Shiqing Ling (Hong Kong University of Science and Technology)

  • Time: May 5, 2019, 15:00-16:00

  • Location: Conference Room 518, Hui Yuan 3#

Abstract

It has been a challenging problem to determine the co-integrating rank in the vector error correction (VEC) model when its noise is a heavy-tailed random vector.  This paper proposes an automated approach via adaptive shrinkage techniques to determine the co-integrating rank and estimate parameters simultaneously in the VEC model with unknown order $p$ when its noises are i.i.d. heavy-tailed random vectors with tail index $\alpha\in (0.2)$. It is showed that the estimated co-integrating rank and order $p$ equal to the true rank and the true order $p_{0}$, respectively, with probability trending to 1 as the sample size $n\to\infty$, while other estimated parameters achieve the oracle property, that is, they have the same rate of convergence and the same limiting distribution as those of estimated parameters when the co-integrating rank and the true order $p_{0}$ are known. This paper also proposes a data-driven procedure of selecting the tuning parameters. Simulation studies are carried to evaluate the performance of this procedure in finite samples. Our techniques are applied to explore the long-run and short-run behavior of prices of wheat, corn and wheat in USA. Our results may provide a new insight to the Lasso approach for both stationary and non-stationary heavy-tailed time series.

(This is a joint work with Feifei Guo)