用延迟剔除广义哈密尔顿蒙特卡洛从多尺度密度中取样

Gilad Turok, Chirag Modi, Bob Carpenter
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引用次数: 0

摘要

随着概率编程语言的日益普及,汉密尔顿蒙特卡洛(HMC)已成为应用贝叶斯推理的主流。然而,HMC 仍然难以从具有多尺度几何特征的密度中采样:需要较大的步长来有效探索低曲率区域,而需要较小的步长来精确探索高曲率区域。受微分方程求解器的启发,我们引入了延迟剔除广义 HMC(DR-G-HMC)采样器,通过采用动态步长选择克服了这一难题。在一次采样迭代中,DR-G-HMC 会在必要时以几何级数递减的步长顺序提出建议。这就以越来越高的保真度模拟了哈密顿动力学,在高曲率区域,生成的建议被接受的几率更高。DR-G-HMC 还能减少拒绝的次数,从而使广义 HMC 更具竞争力,否则会导致低效回溯和阻碍定向移动。我们通过实验证明了 DR-G-HMC:(1)能正确地从多尺度密度中采样;(2)使广义 HMC 方法与最先进的 No-U-Turn 采样器相比更具竞争力;(3)对调整参数具有鲁棒性。
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Sampling From Multiscale Densities With Delayed Rejection Generalized Hamiltonian Monte Carlo
With the increasing prevalence of probabilistic programming languages, Hamiltonian Monte Carlo (HMC) has become the mainstay of applied Bayesian inference. However HMC still struggles to sample from densities with multiscale geometry: a large step size is needed to efficiently explore low curvature regions while a small step size is needed to accurately explore high curvature regions. We introduce the delayed rejection generalized HMC (DR-G-HMC) sampler that overcomes this challenge by employing dynamic step size selection, inspired by differential equation solvers. In a single sampling iteration, DR-G-HMC sequentially makes proposals with geometrically decreasing step sizes if necessary. This simulates Hamiltonian dynamics with increasing fidelity that, in high curvature regions, generates proposals with a higher chance of acceptance. DR-G-HMC also makes generalized HMC competitive by decreasing the number of rejections which otherwise cause inefficient backtracking and prevents directed movement. We present experiments to demonstrate that DR-G-HMC (1) correctly samples from multiscale densities, (2) makes generalized HMC methods competitive with the state of the art No-U-Turn sampler, and (3) is robust to tuning parameters.
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