Stats | |
Bayesian Logistic Regression Model for Sub-Areas | |
article | |
Lu Chen1  Balgobin Nandram2  | |
[1] National Institute of Statistical Sciences;Worcester Polytechnic Institute | |
关键词: hierarchical Bayesian model; integrated nested normal approximation; MCMC; metropolis sampler; numerical integration; parallel computing; | |
DOI : 10.3390/stats6010013 | |
学科分类:农艺学与作物科学 | |
来源: mdpi | |
【 摘 要 】
Many population-based surveys have binary responses from a large number of individuals in each household within small areas. One example is the Nepal Living Standards Survey (NLSS II), in which health status binary data (good versus poor) for each individual from sampled households (sub-areas) are available in the sampled wards (small areas). To make an inference for the finite population proportion of individuals in each household, we use the sub-area logistic regression model with reliable auxiliary information. The contribution of this model is twofold. First, we extend an area-level model to a sub-area level model. Second, because there are numerous sub-areas, standard Markov chain Monte Carlo (MCMC) methods to find the joint posterior density are very time-consuming. Therefore, we provide a sampling-based method, the integrated nested normal approximation (INNA), which permits fast computation. Our main goal is to describe this hierarchical Bayesian logistic regression model and to show that the computation is much faster than the exact MCMC method and also reasonably accurate. The performance of our method is studied by using NLSS II data. Our model can borrow strength from both areas and sub-areas to obtain more efficient and precise estimates. The hierarchical structure of our model captures the variation in the binary data reasonably well.
【 授权许可】
CC BY
【 预 览 】
Files | Size | Format | View |
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RO202307010002519ZK.pdf | 489KB | download |