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Main Authors: She, Rui, Dai, Linlin, Ling, Shiqing
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.11509
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author She, Rui
Dai, Linlin
Ling, Shiqing
author_facet She, Rui
Dai, Linlin
Ling, Shiqing
contents This paper develops a novel two-step estimating procedure for heavy-tailed AR models with non-zero median GARCH-type noises, allowing for time-varying volatility. We first establish the self-weighted quantile regression estimator (SQE) across all quantile levels $τ\in (0,1)$ for the AR parameters $θ_{0}$. We show that the SQE, less a bias, converges weakly to a Gaussian process at a rate of $n^{-1/2}$. The bias is zero if and only if $τ$ equals $τ_{0}$, the probability that the noise is less than zero. Based on the SQE, we propose an approach to estimate $τ_{0}$ in the second step and {feed the estimated $τ_0$ back into the SQE to estimate $θ_0$.} Both the estimated $τ_{0}$ and $θ_{0}$ are shown to be consistent and asymptotically normal. A random weighting bootstrap method is developed to approximate the complex distribution. The problem we study is non-standard because $τ_{0}$ may not be identifiable in conventional quantile regression, and the usual methods cannot verify the existence of the SQE bias. Unlike existing procedures for heavy-tailed time series, our method does not require prior information about the symmetry, tail index, or the parametric form of the noise, nor does it require classical identification conditions, such as zero-mean or zero-median.
format Preprint
id arxiv_https___arxiv_org_abs_2506_11509
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A Two-step Estimating Approach for Heavy-tailed AR Models with Non-zero Median GARCH-type Noises
She, Rui
Dai, Linlin
Ling, Shiqing
Methodology
This paper develops a novel two-step estimating procedure for heavy-tailed AR models with non-zero median GARCH-type noises, allowing for time-varying volatility. We first establish the self-weighted quantile regression estimator (SQE) across all quantile levels $τ\in (0,1)$ for the AR parameters $θ_{0}$. We show that the SQE, less a bias, converges weakly to a Gaussian process at a rate of $n^{-1/2}$. The bias is zero if and only if $τ$ equals $τ_{0}$, the probability that the noise is less than zero. Based on the SQE, we propose an approach to estimate $τ_{0}$ in the second step and {feed the estimated $τ_0$ back into the SQE to estimate $θ_0$.} Both the estimated $τ_{0}$ and $θ_{0}$ are shown to be consistent and asymptotically normal. A random weighting bootstrap method is developed to approximate the complex distribution. The problem we study is non-standard because $τ_{0}$ may not be identifiable in conventional quantile regression, and the usual methods cannot verify the existence of the SQE bias. Unlike existing procedures for heavy-tailed time series, our method does not require prior information about the symmetry, tail index, or the parametric form of the noise, nor does it require classical identification conditions, such as zero-mean or zero-median.
title A Two-step Estimating Approach for Heavy-tailed AR Models with Non-zero Median GARCH-type Noises
topic Methodology
url https://arxiv.org/abs/2506.11509