利用惠特尔似然对线性非高斯状态空间模型进行递归变分高斯逼近

Bao Anh Vu, David Gunawan, Andrew Zammit-Mangion
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引用次数: 0

摘要

线性和非高斯状态空间模型的参数推断是一项挑战,因为似然函数包含一个难以处理的潜在状态变量积分。使用马尔科夫链蒙特卡罗进行精确推断的计算成本很高,尤其是对于长时间序列数据。当精确推断不可行时,变分贝叶斯方法就会派上用场。这些方法通过优化找到一个简单、可操作的分布,从而近似得到参数的后验密度。在本文中,我们提出了一种新的序列变分贝叶斯方法,该方法利用惠特尔似然(Whittlelikelihood)对这类状态空间模型中的参数进行高效计算推断。我们将这种算法称为 "惠特尔似然递归变异高斯逼近算法"(R-VGA-Whittle),它通过处理频域数据来更新变异参数。通过使用线性高斯状态空间模型和单变量/双变量非高斯随机波动性模型的几个例子,我们表明 R-VGA-Whittle 可以很好地近似参数的后验分布,与汉密尔顿蒙特卡洛等渐近精确方法相比,计算效率非常高。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Recursive variational Gaussian approximation with the Whittle likelihood for linear non-Gaussian state space models
Parameter inference for linear and non-Gaussian state space models is challenging because the likelihood function contains an intractable integral over the latent state variables. Exact inference using Markov chain Monte Carlo is computationally expensive, particularly for long time series data. Variational Bayes methods are useful when exact inference is infeasible. These methods approximate the posterior density of the parameters by a simple and tractable distribution found through optimisation. In this paper, we propose a novel sequential variational Bayes approach that makes use of the Whittle likelihood for computationally efficient parameter inference in this class of state space models. Our algorithm, which we call Recursive Variational Gaussian Approximation with the Whittle Likelihood (R-VGA-Whittle), updates the variational parameters by processing data in the frequency domain. At each iteration, R-VGA-Whittle requires the gradient and Hessian of the Whittle log-likelihood, which are available in closed form for a wide class of models. Through several examples using a linear Gaussian state space model and a univariate/bivariate non-Gaussian stochastic volatility model, we show that R-VGA-Whittle provides good approximations to posterior distributions of the parameters and is very computationally efficient when compared to asymptotically exact methods such as Hamiltonian Monte Carlo.
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