Oracle-efficient estimation and trend inference in non-stationary time series with trend and heteroscedastic ARMA error

IF 1.5 3区数学 Q3 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS

Computational Statistics & Data Analysis Pub Date : 2024-01-09 DOI:10.1016/j.csda.2024.107917

Chen Zhong

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引用次数: 0

Abstract

The non-stationary time series often contain an unknown trend and unobserved error terms. The error terms in the proposed model consist of a smooth variance function and the latent stationary ARMA series, which allows heteroscedasticity at different time points. The theoretically justified two-step B-spline estimation method is proposed for the trend and variance function in the model, and then residuals are obtained by removing the trend and variance function estimators from the data. The maximum likelihood estimator (MLE) for the latent ARMA error coefficients based on the residuals is shown to be oracally efficient in the sense that it has the same asymptotic distribution as the infeasible MLE if the trend and variance function were known. In addition to the oracle efficiency, a kernel estimator is obtained for the trend function and shown to converge to the Gumbel distribution. It yields an asymptotically correct simultaneous confidence band (SCB) for the trend function, which can be used to test the specific form of trend. A simulation-based procedure is proposed to implement the SCB, and simulation and real data analysis illustrate the finite sample performance.

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具有趋势和异方差 ARMA 误差的非平稳时间序列中的 Oracle 高效估计和趋势推断

非平稳时间序列通常包含未知趋势和未观测到的误差项。拟议模型中的误差项由平稳方差函数和潜在的静态 ARMA 序列组成，允许不同时间点存在异方差。对模型中的趋势和方差函数提出了理论上合理的两步 B-样条估计方法，然后通过从数据中去除趋势和方差函数估计器得到残差。结果表明，基于残差的潜在 ARMA 误差系数最大似然估计器（MLE）是有效的，因为它与已知趋势和方差函数的不可行 MLE 具有相同的渐近分布。除了神谕效率外，还获得了趋势函数的核估计器，并证明其收敛于 Gumbel 分布。它为趋势函数提供了一个渐近正确的同步置信带（SCB），可用于检验趋势的具体形式。提出了一个基于模拟的程序来实现 SCB，并通过模拟和实际数据分析说明了有限样本的性能。

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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来源期刊

Computational Statistics & Data Analysis 数学-计算机：跨学科应用

CiteScore

3.70

自引率

5.60%

发文量

167

审稿时长

60 days

期刊介绍： Computational Statistics and Data Analysis (CSDA), an Official Publication of the network Computational and Methodological Statistics (CMStatistics) and of the International Association for Statistical Computing (IASC), is an international journal dedicated to the dissemination of methodological research and applications in the areas of computational statistics and data analysis. The journal consists of four refereed sections which are divided into the following subject areas: I) Computational Statistics - Manuscripts dealing with: 1) the explicit impact of computers on statistical methodology (e.g., Bayesian computing, bioinformatics,computer graphics, computer intensive inferential methods, data exploration, data mining, expert systems, heuristics, knowledge based systems, machine learning, neural networks, numerical and optimization methods, parallel computing, statistical databases, statistical systems), and 2) the development, evaluation and validation of statistical software and algorithms. Software and algorithms can be submitted with manuscripts and will be stored together with the online article. II) Statistical Methodology for Data Analysis - Manuscripts dealing with novel and original data analytical strategies and methodologies applied in biostatistics (design and analytic methods for clinical trials, epidemiological studies, statistical genetics, or genetic/environmental interactions), chemometrics, classification, data exploration, density estimation, design of experiments, environmetrics, education, image analysis, marketing, model free data exploration, pattern recognition, psychometrics, statistical physics, image processing, robust procedures. [...] III) Special Applications - [...] IV) Annals of Statistical Data Science [...]