Multiple inflated negative binomial regression for correlated multivariate count data

IF 0.6 Q4 STATISTICS & PROBABILITY

Dependence Modeling Pub Date : 2022-01-01 DOI:10.1515/demo-2022-0149

Joseph Mathews, Sumangala Bhattacharya, Sumen Sen, I. Das

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引用次数: 1

Abstract

Abstract This article aims to provide a method of regression for multivariate multiple inflated count responses assuming the responses follow a negative binomial distribution. Negative binomial regression models are common in the literature for modeling univariate and multivariate count data. However, two problems commonly arise in modeling such data: choice of the multivariate form of the underlying distribution and modeling the zero-inflated structure of the data. Copula functions have become a popular solution to the former problem because they can model the response variables’ dependence structure. The latter problem is often solved by modeling an assumed latent variable Z Z generating excess zero-valued counts in addition to the underlying distribution. However, despite their flexibility, zero-inflation models do not account for the case of m m additional inflated values at k 1 , k 2 , … , k m {{\bf{k}}}_{1},{{\bf{k}}}_{2},\ldots ,{{\bf{k}}}_{m} . We propose a multivariate multiple-inflated negative binomial regression model for modeling such cases. Furthermore, we present an iterative procedure for estimating model parameters using maximum likelihood estimation. The multivariate distribution functions considering the dependence structure of the response vectors are found using copula methods. The proposed method is illustrated using simulated data and applied to real data.

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相关多元计数数据的多重膨胀负二项回归

摘要本文旨在提供一种多元多重膨胀计数响应的回归方法，假设响应服从负二项分布。负二项回归模型在文献中很常见，用于对单变量和多变量计数数据进行建模。然而，在对此类数据建模时通常会出现两个问题：基础分布的多元形式的选择和数据的零膨胀结构的建模。Copula函数已经成为前一个问题的流行解决方案，因为它们可以对响应变量的依赖结构进行建模。后一个问题通常通过对假设的潜在变量Z Z建模来解决，该潜在变量Z除了潜在分布之外还产生多余的零值计数。然而，尽管零膨胀模型具有灵活性，但它们并没有考虑在k1，k2，…，km｛\bf｛k｝｝_｛1｝，｛\b｛k}｝_｝2｝，ldots，｛\bf｛k｝｝_｛m｝处的m个附加膨胀值的情况。我们提出了一个多变量多重膨胀负二项回归模型来模拟这种情况。此外，我们提出了一个使用最大似然估计来估计模型参数的迭代过程。利用copula方法得到了考虑响应向量依赖结构的多元分布函数。利用模拟数据对所提出的方法进行了说明，并将其应用于实际数据。

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

Dependence Modeling STATISTICS & PROBABILITY-

CiteScore

1.00

自引率

0.00%

发文量

审稿时长

12 weeks

期刊介绍： The journal Dependence Modeling aims at providing a medium for exchanging results and ideas in the area of multivariate dependence modeling. It is an open access fully peer-reviewed journal providing the readers with free, instant, and permanent access to all content worldwide. Dependence Modeling is listed by Web of Science (Emerging Sources Citation Index), Scopus, MathSciNet and Zentralblatt Math. The journal presents different types of articles: -"Research Articles" on fundamental theoretical aspects, as well as on significant applications in science, engineering, economics, finance, insurance and other fields. -"Review Articles" which present the existing literature on the specific topic from new perspectives. -"Interview articles" limited to two papers per year, covering interviews with milestone personalities in the field of Dependence Modeling. The journal topics include (but are not limited to):　 -Copula methods -Multivariate distributions -Estimation and goodness-of-fit tests -Measures of association -Quantitative risk management -Risk measures and stochastic orders -Time series -Environmental sciences -Computational methods and software -Extreme-value theory -Limit laws -Mass Transportations