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VarGrad: A Low-Variance Gradient Estimator for Variational Inference

Machine Learning 2020-10-30 v2 Machine Learning Statistics Theory Statistics Theory

Abstract

We analyse the properties of an unbiased gradient estimator of the ELBO for variational inference, based on the score function method with leave-one-out control variates. We show that this gradient estimator can be obtained using a new loss, defined as the variance of the log-ratio between the exact posterior and the variational approximation, which we call the log-variance loss\textit{log-variance loss}. Under certain conditions, the gradient of the log-variance loss equals the gradient of the (negative) ELBO. We show theoretically that this gradient estimator, which we call VarGrad\textit{VarGrad} due to its connection to the log-variance loss, exhibits lower variance than the score function method in certain settings, and that the leave-one-out control variate coefficients are close to the optimal ones. We empirically demonstrate that VarGrad offers a favourable variance versus computation trade-off compared to other state-of-the-art estimators on a discrete VAE.

Cite

@article{arxiv.2010.10436,
  title  = {VarGrad: A Low-Variance Gradient Estimator for Variational Inference},
  author = {Lorenz Richter and Ayman Boustati and Nikolas Nüsken and Francisco J. R. Ruiz and Ömer Deniz Akyildiz},
  journal= {arXiv preprint arXiv:2010.10436},
  year   = {2020}
}
R2 v1 2026-06-23T19:29:44.814Z