Institute of Natural Sciences and School of Mathematical Sciences, Shanghai Jiao Tong University, Shanghai 200240, China
Department of Mathematical Sciences, University of Liverpool, Liverpool, UK
Neural Comput. 2018 Nov;30(11):3072-3094. doi: 10.1162/neco_a_01127. Epub 2018 Sep 14.
We consider Bayesian inference problems with computationally intensive likelihood functions. We propose a Gaussian process (GP)-based method to approximate the joint distribution of the unknown parameters and the data, built on recent work (Kandasamy, Schneider, & Póczos, 2015). In particular, we write the joint density approximately as a product of an approximate posterior density and an exponentiated GP surrogate. We then provide an adaptive algorithm to construct such an approximation, where an active learning method is used to choose the design points. With numerical examples, we illustrate that the proposed method has competitive performance against existing approaches for Bayesian computation.
我们考虑具有计算密集型似然函数的贝叶斯推断问题。我们提出了一种基于高斯过程 (GP) 的方法来近似未知参数和数据的联合分布,该方法基于最近的工作 (Kandasamy、Schneider 和 Póczos,2015)。具体来说,我们将联合密度近似为近似后验密度和指数 GP 替代的乘积。然后,我们提供了一种自适应算法来构建这种近似,其中使用主动学习方法来选择设计点。通过数值示例,我们说明了所提出的方法在贝叶斯计算方面具有与现有方法相当的性能。
