Bayesian inference and prediction for mean-mixtures of normal distributions

IF 1 4区 数学 Q3 STATISTICS & PROBABILITY
Pankaj Bhagwat, É. Marchand
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引用次数: 0

Abstract

We study frequentist risk properties of predictive density estimators for mean mixtures of multivariate normal distributions, involving an unknown location parameter $\theta \in \mathbb{R}^d$, and which include multivariate skew normal distributions. We provide explicit representations for Bayesian posterior and predictive densities, including the benchmark minimum risk equivariant (MRE) density, which is minimax and generalized Bayes with respect to an improper uniform density for $\theta$. For four dimensions or more, we obtain Bayesian densities that improve uniformly on the MRE density under Kullback-Leibler loss. We also provide plug-in type improvements, investigate implications for certain type of parametric restrictions on $\theta$, and illustrate and comment the findings based on numerical evaluations.
正态分布均值混合的贝叶斯推断与预测
我们研究了多元正态分布平均混合的预测密度估计的频率风险性质,涉及未知位置参数$\theta \ \在\mathbb{R}^d$中,并且包含多元偏态正态分布。我们提供了贝叶斯后验密度和预测密度的显式表示,包括基准最小风险等变(MRE)密度,它是关于$\theta$的不适当均匀密度的极小和广义贝叶斯。对于四维或四维以上,我们得到了在Kullback-Leibler损失下均匀提高MRE密度的贝叶斯密度。我们还提供了插件类型的改进,研究了$\theta$上某些类型的参数限制的含义,并基于数值评估说明和评论了研究结果。
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来源期刊
Electronic Journal of Statistics
Electronic Journal of Statistics STATISTICS & PROBABILITY-
CiteScore
1.80
自引率
9.10%
发文量
100
审稿时长
3 months
期刊介绍: The Electronic Journal of Statistics (EJS) publishes research articles and short notes on theoretical, computational and applied statistics. The journal is open access. Articles are refereed and are held to the same standard as articles in other IMS journals. Articles become publicly available shortly after they are accepted.
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