Bayesian inference on sparse multinomial data using smoothed Dirichlet distribution with an application to COVID-19 data

Q4 Mathematics
Lahiru Wickramasinghe, Alexandre Leblanc, Saman Muthukumarana
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引用次数: 1

Abstract

We develop a Bayesian approach for estimating multinomial cell probabilities using a smoothed Dirichlet prior. The most important feature of the smoothed Dirichlet prior is that it forces the probabilities of neighboring cells to be closer to each other than under the standard Dirichlet prior. We propose a shrinkage-type estimator using this Bayesian approach to estimate multinomial cell probabilities. The proposed estimator allows us to borrow information across other multinomial populations and cell categories simultaneously to improve the estimation of cell probabilities, especially in a context of sparsity with ordered categories. We demonstrate the proposed approach using COVID-19 data and estimate the distribution of positive COVID-19 cases across age groups for Canadian health regions. Our approach allows improved estimation in smaller health regions where few cases have been observed.
基于光滑Dirichlet分布的稀疏多项数据贝叶斯推断及其在COVID-19数据中的应用
我们开发了一种贝叶斯方法来估计多项细胞概率使用平滑的狄利克雷先验。平滑狄利克雷先验最重要的特征是,它迫使相邻单元的概率比在标准狄利克雷先验下更接近彼此。我们提出了一个使用贝叶斯方法来估计多项细胞概率的收缩型估计器。所提出的估计器允许我们同时借用其他多项种群和细胞类别的信息来改进细胞概率的估计,特别是在有序类别的稀疏性背景下。我们使用COVID-19数据验证了所提出的方法,并估计了加拿大卫生地区各年龄组COVID-19阳性病例的分布。我们的方法允许在很少观察到病例的较小卫生区域改进估计。
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来源期刊
Model Assisted Statistics and Applications
Model Assisted Statistics and Applications Mathematics-Applied Mathematics
CiteScore
1.00
自引率
0.00%
发文量
26
期刊介绍: Model Assisted Statistics and Applications is a peer reviewed international journal. Model Assisted Statistics means an improvement of inference and analysis by use of correlated information, or an underlying theoretical or design model. This might be the design, adjustment, estimation, or analytical phase of statistical project. This information may be survey generated or coming from an independent source. Original papers in the field of sampling theory, econometrics, time-series, design of experiments, and multivariate analysis will be preferred. Papers of both applied and theoretical topics are acceptable.
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