一种可选的超泊松整数值GARCH模型,应用于小儿麻痹症、互联网协议和COVID-19数据

IF 1.8 3区 数学 Q1 MATHEMATICS
Kee Wah Fo, Seng Huat Ong, Choung Min Ng, You Beng Koh
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引用次数: 0

摘要

& lt; abstract>时间序列计数在精算科学、金融、流行病学和生物学中被广泛观察到。这些时间序列可能表现为过度分散、均匀分散和欠分散。泊松分布通常用于计数时间序列模型,但它受到均值和方差相等的限制。其他分布如广义泊松分布、双泊松分布、超泊松分布和com -泊松分布已被提出来代替泊松分布来模拟计数时间序列中不同程度的分散。这些模型有一定的局限性,如均值和方差的表达式复杂,使GARCH模型的表述复杂化。在这项研究中,我们提出了一个替代的超泊松(AHP)分布,具有条件均值和方差的简单形式,用于整数GARCH (INGARCH)模型,该模型用于计数的时间序列,也表现出不同程度的分散。我们证明了AHP-INGARCH模型与一些现有的INGARCH模型具有可比性。此外,该模型可以覆盖更大范围的色散。最大似然估计可以用来估计模型的参数。对与脊髓灰质炎、互联网协议和COVID-19每日新增死亡人数相关的三个现实数据集的应用,强调了所提出的模型在研究过度分散和不充分分散的计数时间序列方面的有用性。& lt; / abstract>
本文章由计算机程序翻译,如有差异,请以英文原文为准。
An alternative hyper-Poisson integer-valued GARCH model with application to polio, internet protocol and COVID-19 data

Time series of counts are observed widely in actuarial science, finance, epidemiology and biology. These time series may exhibit over-, equi- and under-dispersion. The Poisson distribution is commonly used in count time series models, but it is restricted by the equality of mean and variance. Other distributions such as the generalized Poisson, double Poisson, hyper-Poisson, and COM-Poisson distributions have been proposed to replace the Poisson distribution to model the different levels of dispersion in time series of counts. These models have certain limitations such as complex expressions for the mean and variance which complicate the formulation as GARCH models. In this study, we propose an alternative hyper-Poisson (AHP) distribution, with simple forms of conditional mean and variance, for an integer-valued GARCH (INGARCH) model for time series of counts that also exhibit the different levels of dispersion. We demonstrate that the AHP-INGARCH model is comparable to some existing INGARCH models. Additionally, the model can cover a wider range of dispersion. The maximum likelihood estimation can be used to estimate the parameters of the proposed model. Applications to three real-life data sets related to polio, internet protocol and daily COVID-19 new deaths underscore the usefulness of the proposed model in studying both over-dispersed and under-dispersed time series of counts.

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来源期刊
AIMS Mathematics
AIMS Mathematics Mathematics-General Mathematics
CiteScore
3.40
自引率
13.60%
发文量
769
审稿时长
90 days
期刊介绍: AIMS Mathematics is an international Open Access journal devoted to publishing peer-reviewed, high quality, original papers in all fields of mathematics. We publish the following article types: original research articles, reviews, editorials, letters, and conference reports.
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