贝叶斯推理和反演中的变量先验替换

IF 2.8 3区 地球科学 Q2 GEOCHEMISTRY & GEOPHYSICS Geophysical Journal International Pub Date : 2024-09-13 DOI:10.1093/gji/ggae334
Xuebin Zhao, Andrew Curtis
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引用次数: 0

摘要

摘要 许多科学研究需要利用记录的数据来估计一组模型参数的值。在贝叶斯推理中,通过计算后验概率分布函数,将来自观测数据和先验知识的信息结合起来,以概率方式更新模型参数。先验信息通常用先验概率分布来描述。在科学项目过程中,我们会遇到希望改变先验信息的情况。然而,估算任何一个贝叶斯推理问题的解决方案通常都需要高昂的计算成本,因为这通常需要绘制许多模型样本,并且必须模拟如果每个样本为真则会记录的数据集。因此,每当先验信息发生变化时,重新计算贝叶斯推理方案的成本就会非常高昂。我们开发了一种数学公式,允许使用变异方法改变解决方案中的先验信息,而无需重新计算原始贝叶斯推理。在这种方法中,现有的先验信息会从先前获得的后验分布中移除,取而代之的是新的先验信息。因此,我们称这种方法为变分先验替换法(VPR)。我们用一个二维地震全波形反演的例子来演示 VPR,在这个例子中,VPR 提供的后验解与使用不同先验分布解决独立推理问题得到的后验解相似。前者可在笔记本电脑上几分钟内完成,而后者则需要使用高性能计算资源进行数天的计算。我们通过比较使用三种不同类型的先验信息(均匀先验分布、平滑先验分布和地质先验分布)获得的后验解决方案,证明了该方法的价值。
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Variational Prior Replacement in Bayesian inference and inversion
Summary Many scientific investigations require that the values of a set of model parameters are estimated using recorded data. In Bayesian inference, information from both observed data and prior knowledge is combined to update model parameters probabilistically by calculating the posterior probability distribution function. Prior information is often described by a prior probability distribution. Situations arise in which we wish to change prior information during the course of a scientific project. However, estimating the solution to any single Bayesian inference problem is often computationally costly, as it typically requires many model samples to be drawn, and the data set that would have been recorded if each sample was true must be simulated. Recalculating the Bayesian inference solution every time prior information changes can therefore be extremely expensive. We develop a mathematical formulation that allows the prior information that is embedded within a solution, to be changed using variational methods, without recalculating the original Bayesian inference. In this method, existing prior information is removed from a previously obtained posterior distribution and is replaced by new prior information. We therefore call the methodology variational prior replacement (VPR). We demonstrate VPR using a 2D seismic full waveform inversion example, in which VPR provides similar posterior solutions to those obtained by solving independent inference problems using different prior distributions. The former can be completed within minutes on a laptop computer, whereas the latter requires days of computations using high-performance computing resources. We demonstrate the value of the method by comparing the posterior solutions obtained using three different types of prior information: uniform, smoothing and geological prior distributions.
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来源期刊
Geophysical Journal International
Geophysical Journal International 地学-地球化学与地球物理
CiteScore
5.40
自引率
10.70%
发文量
436
审稿时长
3.3 months
期刊介绍: Geophysical Journal International publishes top quality research papers, express letters, invited review papers and book reviews on all aspects of theoretical, computational, applied and observational geophysics.
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