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Is Importance Weighting Incompatible with Interpolating Classifiers?

Machine Learning 2022-03-07 v2 Machine Learning

Abstract

Importance weighting is a classic technique to handle distribution shifts. However, prior work has presented strong empirical and theoretical evidence demonstrating that importance weights can have little to no effect on overparameterized neural networks. Is importance weighting truly incompatible with the training of overparameterized neural networks? Our paper answers this in the negative. We show that importance weighting fails not because of the overparameterization, but instead, as a result of using exponentially-tailed losses like the logistic or cross-entropy loss. As a remedy, we show that polynomially-tailed losses restore the effects of importance reweighting in correcting distribution shift in overparameterized models. We characterize the behavior of gradient descent on importance weighted polynomially-tailed losses with overparameterized linear models, and theoretically demonstrate the advantage of using polynomially-tailed losses in a label shift setting. Surprisingly, our theory shows that using weights that are obtained by exponentiating the classical unbiased importance weights can improve performance. Finally, we demonstrate the practical value of our analysis with neural network experiments on a subpopulation shift and a label shift dataset. When reweighted, our loss function can outperform reweighted cross-entropy by as much as 9% in test accuracy. Our loss function also gives test accuracies comparable to, or even exceeding, well-tuned state-of-the-art methods for correcting distribution shifts.

Cite

@article{arxiv.2112.12986,
  title  = {Is Importance Weighting Incompatible with Interpolating Classifiers?},
  author = {Ke Alexander Wang and Niladri S. Chatterji and Saminul Haque and Tatsunori Hashimoto},
  journal= {arXiv preprint arXiv:2112.12986},
  year   = {2022}
}

Comments

International Conference on Learning Representations (ICLR), 2022

R2 v1 2026-06-24T08:30:48.160Z