Bayesian Nonparametric Quasi Likelihood

arXiv - STAT - Other Statistics Pub Date : 2024-05-31 DOI:arxiv-2405.20601

Antonio R. Linero

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Abstract

A recent trend in Bayesian research has been revisiting generalizations of the likelihood that enable Bayesian inference without requiring the specification of a model for the data generating mechanism. This paper focuses on a Bayesian nonparametric extension of Wedderburn's quasi-likelihood, using Bayesian additive regression trees to model the mean function. Here, the analyst posits only a structural relationship between the mean and variance of the outcome. We show that this approach provides a unified, computationally efficient, framework for extending Bayesian decision tree ensembles to many new settings, including simplex-valued and heavily heteroskedastic data. We also introduce Bayesian strategies for inferring the dispersion parameter of the quasi-likelihood, a task which is complicated by the fact that the quasi-likelihood itself does not contain information about this parameter; despite these challenges, we are able to inject updates for the dispersion parameter into a Markov chain Monte Carlo inference scheme in a way that, in the parametric setting, leads to a Bernstein-von Mises result for the stationary distribution of the resulting Markov chain. We illustrate the utility of our approach on a variety of both synthetic and non-synthetic datasets.

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贝叶斯非参数准似然法

最近，贝叶斯研究的一个趋势是重新审视似然法的一般化，这种似然法无需为数据生成机制指定模型即可进行贝叶斯推断。本文的重点是韦德伯恩准似然法的贝叶斯非参数扩展，使用贝叶斯加性回归树来建立均值函数模型。在这里，分析者只假设结果的均值和方差之间存在结构关系。我们的研究表明，这种方法提供了一个统一的、计算效率高的框架，可以将贝叶斯决策树集合扩展到许多新闻环境，包括单值数据和重度异方差数据。我们还引入了贝叶斯策略来推断卡方概率的离散参数，由于卡方概率本身并不包含该参数的信息，因此这项任务变得非常复杂；尽管存在这些挑战，我们还是能够将离散参数的更新注入马尔可夫链蒙特卡罗推断方案中，在参数设置中，这种方法可以为所得到的马尔可夫链的平稳分布带来伯恩斯坦-冯-米塞斯结果。我们在各种合成和非合成数据集上说明了这种方法的实用性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - STAT - Other Statistics

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