U-Statistics for Importance-Weighted Variational Inference
Abstract
We propose the use of U-statistics to reduce variance for gradient estimation in importance-weighted variational inference. The key observation is that, given a base gradient estimator that requires samples and a total of samples to be used for estimation, lower variance is achieved by averaging the base estimator on overlapping batches of size than disjoint batches, as currently done. We use classical U-statistic theory to analyze the variance reduction, and propose novel approximations with theoretical guarantees to ensure computational efficiency. We find empirically that U-statistic variance reduction can lead to modest to significant improvements in inference performance on a range of models, with little computational cost.
Cite
@article{arxiv.2302.13918,
title = {U-Statistics for Importance-Weighted Variational Inference},
author = {Javier Burroni and Kenta Takatsu and Justin Domke and Daniel Sheldon},
journal= {arXiv preprint arXiv:2302.13918},
year = {2023}
}
Comments
Accepted at Transactions on Machine Learning Research (TMLR)