Alpha-divergence Variational Inference Meets Importance Weighted Auto-Encoders: Methodology and Asymptotics

Kam'elia Daudel, Joe Benton, Yuyang Shi, A. Doucet
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引用次数: 1

Abstract

Several algorithms involving the Variational R\'enyi (VR) bound have been proposed to minimize an alpha-divergence between a target posterior distribution and a variational distribution. Despite promising empirical results, those algorithms resort to biased stochastic gradient descent procedures and thus lack theoretical guarantees. In this paper, we formalize and study the VR-IWAE bound, a generalization of the Importance Weighted Auto-Encoder (IWAE) bound. We show that the VR-IWAE bound enjoys several desirable properties and notably leads to the same stochastic gradient descent procedure as the VR bound in the reparameterized case, but this time by relying on unbiased gradient estimators. We then provide two complementary theoretical analyses of the VR-IWAE bound and thus of the standard IWAE bound. Those analyses shed light on the benefits or lack thereof of these bounds. Lastly, we illustrate our theoretical claims over toy and real-data examples.
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α散度变分推理满足重要性加权自编码器:方法学和渐近性
已经提出了几种涉及变分R\ enyi (VR)界的算法来最小化目标后验分布和变分分布之间的α散度。尽管有希望的经验结果,这些算法诉诸于有偏差的随机梯度下降过程,因此缺乏理论保证。本文对重要性加权自编码器界(IWAE)的推广——VR-IWAE界进行形式化研究。我们表明,VR- iwae界具有几个理想的性质,并且在重参数化情况下显著导致与VR界相同的随机梯度下降过程,但这一次依赖于无偏梯度估计。然后,我们对VR-IWAE界和标准IWAE界提供了两个互补的理论分析。这些分析揭示了这些限制的利弊。最后,我们通过玩具和实际数据示例说明了我们的理论主张。
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