Covariance-based MCMC for high-dimensional Bayesian updating with Sequential Monte Carlo

IF 3 3区 工程技术 Q2 ENGINEERING, MECHANICAL
Barbara Carrera , Iason Papaioannou
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引用次数: 0

Abstract

Sequential Monte Carlo (SMC) is a reliable method to generate samples from the posterior parameter distribution in a Bayesian updating context. The method samples a series of distributions sequentially, which start from the prior distribution and gradually approach the posterior distribution. Sampling from the distribution sequence is performed through application of a resample-move scheme, whereby the move step is performed using a Markov Chain Monte Carlo (MCMC) algorithm. The preconditioned Crank–Nicolson (pCN) is a popular choice for the MCMC step in high dimensional Bayesian updating problems, since its performance is invariant to the dimension of the prior distribution. This paper proposes two other SMC variants that use covariance information to inform the MCMC distribution proposals and compares their performance to the one of pCN-based SMC. Particularly, a variation of the pCN algorithm that employs covariance information, and the principle component Metropolis Hastings algorithm are considered. These algorithms are combined with an intermittent and recursive updating scheme of the target distribution covariance matrix based on the current MCMC progress. We test the performance of the algorithms in three numerical examples; a two dimensional algebraic example, the estimation of the flexibility of a cantilever beam and the estimation of the hydraulic conductivity field of an aquifer. The results show that covariance-based MCMC algorithms are capable of producing smaller errors in parameter mean and variance and better estimates of the model evidence compared to the pCN approach.

基于协方差的 MCMC,利用序列蒙特卡洛进行高维贝叶斯更新
序列蒙特卡罗(SMC)是在贝叶斯更新背景下从后验参数分布生成样本的一种可靠方法。该方法按顺序对一系列分布进行采样,这些分布从先验分布开始,逐渐接近后验分布。从分布序列中采样是通过应用重采样-移动方案进行的,其中移动步骤是使用马尔可夫链蒙特卡罗(MCMC)算法进行的。在高维贝叶斯更新问题中,预条件 Crank-Nicolson 算法(pCN)是 MCMC 步骤的常用选择,因为它的性能与先验分布的维数无关。本文提出了另外两种使用协方差信息为 MCMC 分布建议提供信息的 SMC 变体,并比较了它们与基于 pCN 的 SMC 的性能。特别是,本文考虑了使用协方差信息的 pCN 算法变体和原理成分 Metropolis Hastings 算法。这些算法与基于当前 MCMC 进度的目标分布协方差矩阵间歇递归更新方案相结合。我们在三个数值示例中测试了这些算法的性能:二维代数示例、悬臂梁柔性估计和含水层水力传导场估计。结果表明,与 pCN 方法相比,基于协方差的 MCMC 算法能够产生更小的参数均值和方差误差,以及更好的模型证据估计。
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
Probabilistic Engineering Mechanics
Probabilistic Engineering Mechanics 工程技术-工程:机械
CiteScore
3.80
自引率
15.40%
发文量
98
审稿时长
13.5 months
期刊介绍: This journal provides a forum for scholarly work dealing primarily with probabilistic and statistical approaches to contemporary solid/structural and fluid mechanics problems encountered in diverse technical disciplines such as aerospace, civil, marine, mechanical, and nuclear engineering. The journal aims to maintain a healthy balance between general solution techniques and problem-specific results, encouraging a fruitful exchange of ideas among disparate engineering specialities.
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