Log-density gradient covariance and automatic metric tensors for Riemann manifold Monte Carlo methods†

IF 0.8 4区 数学 Q3 STATISTICS & PROBABILITY Scandinavian Journal of Statistics Pub Date : 2023-12-26 DOI:10.1111/sjos.12705
Tore Selland Kleppe
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引用次数: 0

Abstract

A metric tensor for Riemann manifold Monte Carlo particularly suited for non-linear Bayesian hierarchical models is proposed. The metric tensor is built from symmetric positive semidefinite log-density gradient covariance (LGC) matrices, which are also proposed and further explored here. The LGCs generalize the Fisher information matrix by measuring the joint information content and dependence structure of both a random variable and the parameters of said variable. Consequently, positive definite Fisher/LGC-based metric tensors may be constructed not only from the observation likelihoods as is current practice, but also from arbitrarily complicated non-linear prior/latent variable structures, provided the LGC may be derived for each conditional distribution used to construct said structures. The proposed methodology is highly automatic and allows for exploitation of any sparsity associated with the model in question. When implemented in conjunction with a Riemann manifold variant of the recently proposed numerical generalized randomized Hamiltonian Monte Carlo processes, the proposed methodology is highly competitive, in particular for the more challenging target distributions associated with Bayesian hierarchical models.
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黎曼流形蒙特卡罗方法的对数密度梯度协方差和自动度量张量†。
本文提出了一种特别适用于非线性贝叶斯层次模型的黎曼流形蒙特卡罗度量张量。该度量张量由对称正半有限对数密度梯度协方差(LGC)矩阵构建而成。LGC 通过测量随机变量和所述变量参数的联合信息含量和依赖结构,对费雪信息矩阵进行了概括。因此,基于正定费雪/LGC 的度量张量不仅可以像目前的做法那样从观测似然构建,还可以从任意复杂的非线性先验/后验变量结构构建,前提是可以为用于构建上述结构的每个条件分布导出 LGC。所提出的方法具有很高的自动性,可以利用与相关模型有关的任何稀疏性。当与最近提出的数值广义随机哈密尔顿蒙特卡罗过程的黎曼流形变体结合使用时,所提出的方法具有很强的竞争力,特别是对于与贝叶斯层次模型相关的更具挑战性的目标分布。
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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来源期刊
Scandinavian Journal of Statistics
Scandinavian Journal of Statistics 数学-统计学与概率论
CiteScore
1.80
自引率
0.00%
发文量
61
审稿时长
6-12 weeks
期刊介绍: The Scandinavian Journal of Statistics is internationally recognised as one of the leading statistical journals in the world. It was founded in 1974 by four Scandinavian statistical societies. Today more than eighty per cent of the manuscripts are submitted from outside Scandinavia. It is an international journal devoted to reporting significant and innovative original contributions to statistical methodology, both theory and applications. The journal specializes in statistical modelling showing particular appreciation of the underlying substantive research problems. The emergence of specialized methods for analysing longitudinal and spatial data is just one example of an area of important methodological development in which the Scandinavian Journal of Statistics has a particular niche.
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