吉布斯随机场的高效MCMC预计算

A. Boland, N. Friel, F. Maire
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引用次数: 17

摘要

吉布斯随机场(GRFs)的贝叶斯推理通常被称为双重棘手问题,因为其似然函数是棘手的。对此类模型后验分布的探索通常采用复杂的马尔可夫链蒙特卡罗(MCMC)方法,即交换算法(Murray等人,2006),这需要在每次迭代时从似然函数进行模拟。本文的目的是考虑一种显著减少这种计算开销的方法。为此,我们引入了一类新的算法,它使用GRF模型的实现,在跨越参数空间的网格指定的位置进行离线模拟。这种策略极大地加快了后验推理,如几个例子所示。然而,使用预先计算的图在MCMC算法中引入了噪声,这不再是精确的。我们研究了所得到的近似MCMC算法的理论行为,并利用近似MCMC方法的最新理论发展推导出收敛界。
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Efficient MCMC for Gibbs Random Fields using pre-computation
Bayesian inference of Gibbs random fields (GRFs) is often referred to as a doubly intractable problem, since the likelihood function is intractable. The exploration of the posterior distribution of such models is typically carried out with a sophisticated Markov chain Monte Carlo (MCMC) method, the exchange algorithm (Murray et al., 2006), which requires simulations from the likelihood function at each iteration. The purpose of this paper is to consider an approach to dramatically reduce this computational overhead. To this end we introduce a novel class of algorithms which use realizations of the GRF model, simulated offline, at locations specified by a grid that spans the parameter space. This strategy speeds up dramatically the posterior inference, as illustrated on several examples. However, using the pre-computed graphs introduces a noise in the MCMC algorithm, which is no longer exact. We study the theoretical behaviour of the resulting approximate MCMC algorithm and derive convergence bounds using a recent theoretical development on approximate MCMC methods.
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