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arxiv: 2010.04838 · v1 · pith:WYBGW4A2 · submitted 2020-10-09 · stat.ML · cs.LG

Rao-Blackwellizing the Straight-Through Gumbel-Softmax Gradient Estimator

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classification stat.ML cs.LG
keywords estimatorsvarianceerrorestimatorevaluationsfunctiongradientgumbel-softmax
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Gradient estimation in models with discrete latent variables is a challenging problem, because the simplest unbiased estimators tend to have high variance. To counteract this, modern estimators either introduce bias, rely on multiple function evaluations, or use learned, input-dependent baselines. Thus, there is a need for estimators that require minimal tuning, are computationally cheap, and have low mean squared error. In this paper, we show that the variance of the straight-through variant of the popular Gumbel-Softmax estimator can be reduced through Rao-Blackwellization without increasing the number of function evaluations. This provably reduces the mean squared error. We empirically demonstrate that this leads to variance reduction, faster convergence, and generally improved performance in two unsupervised latent variable models.

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Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. The Theorems of Dr. David Blackwell and Their Contributions to Artificial Intelligence

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    Blackwell's Rao-Blackwell, Approachability, and Informativeness theorems provide frameworks for variance reduction, sequential decisions under uncertainty, and comparing information sources that remain relevant to AI.