Flexible online multivariate regression with variational Bayes and the matrix-variate Dirichlet process

IF 1.7 Q2 MATHEMATICS, APPLIED
Meng Hwee Victor Ong, D. Nott, A. Jasra
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引用次数: 0

Abstract

Flexible regression methods where interest centres on the way that the whole distribution of a response vector changes with covariates are very useful in some applications. A recently developed technique in this regard uses the matrix-variate Dirichlet process as a prior for a mixing distribution on a coefficient in a multivariate linear regression model. The method is attractive, particularly in the multivariate setting, for the convenient way that it allows for borrowing strength across different component regressions and for its computational simplicity and tractability. The purpose of the present article is to develop fast online variational Bayes approaches to fitting this model and to investigate how they perform compared to MCMC and batch variational methods in a number of scenarios.
基于变分贝叶斯和矩阵-变量狄利克雷过程的灵活在线多元回归
在某些应用中,关注响应向量的整个分布随协变量变化的灵活回归方法是非常有用的。在这方面,最近发展的一种技术使用矩阵-变量狄利克雷过程作为多元线性回归模型中系数混合分布的先验。该方法很有吸引力,特别是在多变量设置中,因为它允许在不同的组件回归中借用强度的方便方式,以及它的计算简单性和可追溯性。本文的目的是开发快速的在线变分贝叶斯方法来拟合该模型,并研究它们与MCMC和批变分方法在许多场景中的表现。
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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CiteScore
3.30
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0.00%
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