双广义线性Tweedie空间过程模型中的贝叶斯变量选择

Aritra Halder, Shariq Mohammed, D. Dey
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引用次数: 1

摘要

双广义线性模型为数据建模提供了一个灵活的框架,允许平均值和离散度在观测值之间变化。已知指数色散族的常见成员,包括高斯,泊松,复合泊松-伽马(CP-g),伽马和逆高斯都允许这样的模型。缺乏它们的使用可归因于在大量协变量下模型规范中存在的模糊性以及当数据显示复杂的空间依赖性时出现的复杂性。在这项工作中,我们考虑了具有空间随机效应的CP-g模型的分层规范。空间效应的目标是通过对响应的基于位置的索引产生的数据中的依赖性进行建模来进行不确定性量化。我们关注空间效应的高斯过程规范。同时,我们利用贝叶斯变量选择方法解决了这类模型的模型规范问题。它是通过一个连续的尖峰和板先验对模型参数的影响,特别是固定效应。我们的贡献的新颖之处在于为这些模型开发的贝叶斯框架。我们执行各种合成实验来展示我们框架的准确性。然后将它们应用于分析康涅狄格州2008年的汽车保险费。
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Bayesian Variable Selection in Double Generalized Linear Tweedie Spatial Process Models
Double generalized linear models provide a flexible framework for modeling data by allowing the mean and the dispersion to vary across observations. Common members of the exponential dispersion family including the Gaussian, Poisson, compound Poisson-gamma (CP-g), Gamma and inverse-Gaussian are known to admit such models. The lack of their use can be attributed to ambiguities that exist in model specification under a large number of covariates and complications that arise when data display complex spatial dependence. In this work we consider a hierarchical specification for the CP-g model with a spatial random effect. The spatial effect is targeted at performing uncertainty quantification by modeling dependence within the data arising from location based indexing of the response. We focus on a Gaussian process specification for the spatial effect. Simultaneously, we tackle the problem of model specification for such models using Bayesian variable selection. It is effected through a continuous spike and slab prior on the model parameters, specifically the fixed effects. The novelty of our contribution lies in the Bayesian frameworks developed for such models. We perform various synthetic experiments to showcase the accuracy of our frameworks. They are then applied to analyze automobile insurance premiums in Connecticut, for the year of 2008.
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Modeling Multivariate Spatial Dependencies Using Graphical Models. Effect of model space priors on statistical inference with model uncertainty. Bayesian Variable Selection in Double Generalized Linear Tweedie Spatial Process Models Bayesian D-Optimal Design of Experiments with Quantitative and Qualitative Responses Construction of Supersaturated Designs with Small Coherence for Variable Selection
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