地理加权零膨胀负二项回归:计数数据的一般情况

IF 2.1 2区 数学 Q3 GEOSCIENCES, MULTIDISCIPLINARY
Alan Ricardo da Silva, Marcos Douglas Rodrigues de Sousa
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引用次数: 0

摘要

泊松和负二项回归模型常用于描述一个计数因变量和一组自变量之间的关系。然而,这些模型不能分析超过零的数据,零膨胀泊松(ZIP)和零膨胀负二项(ZINB)模型最适合拟合这类数据。为了将空间维度纳入计数数据模型,我们开发了地理加权泊松回归(GWPR)、地理加权负二项回归(GWNBR)和地理加权零膨胀泊松回归(GWZIPR),但为了将过度分散和零过剩(如COVID-19大流行开始时)纳入,负二项分布的零膨胀部分尚未开发。一些地方出现了病例爆发,而另一些地方还没有出现病例。因此,我们提出了一个地理加权零膨胀负二项回归(GWZINBR)模型,它可以被认为是计数数据的一般情况,因为局部它可以成为GWZIPR, GWNBR或GWPR模型。我们将该模型应用于模拟数据和2020年大流行初期韩国的COVID-19病例,结果显示,与GWNBR模型相比,该模型对这一现象有了更好的理解。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Geographically Weighted Zero-Inflated Negative Binomial Regression: A general case for count data

Poisson and Negative Binomial Regression Models are often used to describe the relationship between a count dependent variable and a set of independent variables. However, these models fail to analyze data with an excess of zeros, being Zero-Inflated Poisson (ZIP) and Zero-Inflated Negative Binomial (ZINB) models the most appropriate to fit this kind of data. To Incorporate the spatial dimension into the count data models, Geographically Weighted Poisson Regression (GWPR), Geographically Weighted Negative Binomial Regression (GWNBR) and Geographically Weighted Zero-Inflated Poisson Regression (GWZIPR) have been developed, but the zero-inflation part of the negative binomial distribution is undeveloped in order to incorporate the overdispersion and the excess of zeros, as was at the beginning of the COVID-19 pandemic, whereas some places were having an outbreak of cases and in others places, there were no cases yet. Therefore, we propose a Geographically Weighted Zero-Inflated Negative Binomial Regression (GWZINBR) model which can be considered a general case for count data, since locally it can become a GWZIPR, GWNBR or a GWPR model. We applied this model to simulated data and to the cases of COVID-19 in South Korea at the beginning of the pandemic in 2020 and the results showed a better understanding of the phenomenon compared to the GWNBR model.

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来源期刊
Spatial Statistics
Spatial Statistics GEOSCIENCES, MULTIDISCIPLINARY-MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
CiteScore
4.00
自引率
21.70%
发文量
89
审稿时长
55 days
期刊介绍: Spatial Statistics publishes articles on the theory and application of spatial and spatio-temporal statistics. It favours manuscripts that present theory generated by new applications, or in which new theory is applied to an important practical case. A purely theoretical study will only rarely be accepted. Pure case studies without methodological development are not acceptable for publication. Spatial statistics concerns the quantitative analysis of spatial and spatio-temporal data, including their statistical dependencies, accuracy and uncertainties. Methodology for spatial statistics is typically found in probability theory, stochastic modelling and mathematical statistics as well as in information science. Spatial statistics is used in mapping, assessing spatial data quality, sampling design optimisation, modelling of dependence structures, and drawing of valid inference from a limited set of spatio-temporal data.
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