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Main Authors: Su, Bing, Zhu, Ke
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.18377
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author Su, Bing
Zhu, Ke
author_facet Su, Bing
Zhu, Ke
contents We propose a panel ARMA-GARCH model to capture the dynamics of large panel data with $N$ individuals over $T$ time periods. For this model, we provide a two-step estimation procedure to estimate the ARMA parameters and GARCH parameters stepwisely. Under some regular conditions, we show that all of the proposed estimators are asymptotically normal with the convergence rate $(NT)^{-1/2}$, and they have the asymptotic biases when both $N$ and $T$ diverge to infinity at the same rate. Particularly, we find that the asymptotic biases result from the fixed effect, estimation effect, and unobservable initial values. To correct the biases, we further propose the bias-corrected version of estimators by using either the analytical asymptotics or jackknife method. Our asymptotic results are based on a new central limit theorem for the linear-quadratic form in the martingale difference sequence, when the weight matrix is uniformly bounded in row and column. Simulations and one real example are given to demonstrate the usefulness of our panel ARMA-GARCH model.
format Preprint
id arxiv_https___arxiv_org_abs_2404_18377
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Inference for the panel ARMA-GARCH model when both $N$ and $T$ are large
Su, Bing
Zhu, Ke
Methodology
We propose a panel ARMA-GARCH model to capture the dynamics of large panel data with $N$ individuals over $T$ time periods. For this model, we provide a two-step estimation procedure to estimate the ARMA parameters and GARCH parameters stepwisely. Under some regular conditions, we show that all of the proposed estimators are asymptotically normal with the convergence rate $(NT)^{-1/2}$, and they have the asymptotic biases when both $N$ and $T$ diverge to infinity at the same rate. Particularly, we find that the asymptotic biases result from the fixed effect, estimation effect, and unobservable initial values. To correct the biases, we further propose the bias-corrected version of estimators by using either the analytical asymptotics or jackknife method. Our asymptotic results are based on a new central limit theorem for the linear-quadratic form in the martingale difference sequence, when the weight matrix is uniformly bounded in row and column. Simulations and one real example are given to demonstrate the usefulness of our panel ARMA-GARCH model.
title Inference for the panel ARMA-GARCH model when both $N$ and $T$ are large
topic Methodology
url https://arxiv.org/abs/2404.18377