Spatial survival modelling of business re-opening after Katrina: Survival modelling compared to spatial probit modelling of re-opening within 3, 6 or 12 months
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引用次数: 1
Abstract
Zhou and Hanson; Zhou and Hanson; Zhou and Hanson (2015, Nonparametric Bayesian Inference in Biostatistics, pages 215–46. Cham: Springer; 2018, Journal of the American Statistical Association, 113, 571–81; 2020, spBayesSurv: Bayesian Modeling and Analysis of Spatially Correlated Survival Data. R package version 1.1.4) and Zhou et al. (2020, Journal of Statistical Software, Articles, 92, 1–33) present methods for estimating spatial survival models using areal data. This article applies their methods to a dataset recording New Orleans business decisions to re-open after Hurricane Katrina; the data were included in LeSage et al. (2011b, Journal of the Royal Statistical Society: Series A (Statistics in Society), 174, 1007—27). In two articles (LeSage etal., 2011a, Significance, 8, 160—63; 2011b, Journal of the Royal Statistical Society: Series A (Statistics in Society), 174, 1007—27), spatial probit models are used to model spatial dependence in this dataset, with decisions to re-open aggregated to the first 90, 180 and 360 days. We re-cast the problem as one of examining the time-to-event records in the data, right-censored as observations ceased before 175 businesses had re-opened; we omit businesses already re-opened when observations began on Day 41. We are interested in checking whether the conclusions about the covariates using aspatial and spatial probit models are modified when applying survival and spatial survival models estimated using MCMC and INLA. In general, we find that the same covariates are associated with re-opening decisions in both modelling approaches. We do however find that data collected from three streets differ substantially, and that the streets are probably better handled separately or that the street effect should be included explicitly.
周和汉森;周和汉森;周和汉森(2015,生物统计学中的非参数贝叶斯推断,第215–46页。查姆:施普林格;2018年,《美国统计协会杂志》,113571–81;2020,spBayesSurv:空间相关生存数据的贝叶斯建模和分析。R软件包1.1.4版)和周等人(2020,《统计软件杂志》,文章,92,1-33)提出了使用区域数据估计空间生存模型的方法。本文将他们的方法应用于一个数据集,该数据集记录了卡特里娜飓风后新奥尔良重新开业的商业决策;数据包含在LeSage等人(2011b,英国皇家统计学会杂志:A系列(社会统计),1741007-27)中。在两篇文章中(LeSage et al.,2011a,Significance,8160-63;2011b,Journal of the Royal Statistical Society:Series A(Statistics In Society),1741007-27),空间概率模型用于对该数据集中的空间依赖性进行建模,并决定在前90、180和360天重新开放。我们将这个问题重新描述为检查数据中的事件时间记录,在175家企业重新开业之前,由于观察结果停止,因此对其进行了严格审查;我们忽略了第41天开始观察时已经重新开业的企业。当应用使用MCMC和INLA估计的生存率和空间生存率模型时,我们有兴趣检查使用空间概率和空间概率模型的关于协变量的结论是否被修改。通常,我们发现在两种建模方法中,相同的协变量与重新开放决策相关。然而,我们确实发现,从三条街道收集的数据存在很大差异,这些街道可能最好单独处理,或者应该明确包括街道效应。
期刊介绍:
The primary aim of the journal is to publish original and high-quality articles that recognize statistical modelling as the general framework for the application of statistical ideas. Submissions must reflect important developments, extensions, and applications in statistical modelling. The journal also encourages submissions that describe scientifically interesting, complex or novel statistical modelling aspects from a wide diversity of disciplines, and submissions that embrace the diversity of applied statistical modelling.