Optimal Regularization Can Mitigate Double Descent

March 04, 2020 ยท Declared Dead ยท ๐Ÿ› International Conference on Learning Representations

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Authors Preetum Nakkiran, Prayaag Venkat, Sham Kakade, Tengyu Ma arXiv ID 2003.01897 Category cs.LG: Machine Learning Cross-listed cs.NE, math.ST, stat.ML Citations 148 Venue International Conference on Learning Representations Last Checked 4 months ago
Abstract
Recent empirical and theoretical studies have shown that many learning algorithms -- from linear regression to neural networks -- can have test performance that is non-monotonic in quantities such the sample size and model size. This striking phenomenon, often referred to as "double descent", has raised questions of if we need to re-think our current understanding of generalization. In this work, we study whether the double-descent phenomenon can be avoided by using optimal regularization. Theoretically, we prove that for certain linear regression models with isotropic data distribution, optimally-tuned $\ell_2$ regularization achieves monotonic test performance as we grow either the sample size or the model size. We also demonstrate empirically that optimally-tuned $\ell_2$ regularization can mitigate double descent for more general models, including neural networks. Our results suggest that it may also be informative to study the test risk scalings of various algorithms in the context of appropriately tuned regularization.
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