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Main Authors: Wu, Diyuan, Chen, Lehan, Misiakiewicz, Theodor, Mondelli, Marco
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.05691
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author Wu, Diyuan
Chen, Lehan
Misiakiewicz, Theodor
Mondelli, Marco
author_facet Wu, Diyuan
Chen, Lehan
Misiakiewicz, Theodor
Mondelli, Marco
contents It is increasingly common in machine learning to use learned models to label data and then employ such data to train more capable models. The phenomenon of weak-to-strong generalization exemplifies the advantage of this two-stage procedure: a strong student is trained on imperfect labels obtained from a weak teacher, and yet the strong student outperforms the weak teacher. In this paper, we show that the potential improvement is substantial, in the sense that it affects the scaling law followed by the test error. Specifically, we consider students and teachers trained via random feature ridge regression (RFRR). Our main technical contribution is to derive a deterministic equivalent for the excess test error of the student trained on labels obtained via the teacher. Via this deterministic equivalent, we then identify regimes in which the scaling law of the student improves upon that of the teacher, unveiling that the improvement can be achieved both in bias-dominated and variance-dominated settings. Strikingly, the student may attain the minimax optimal rate regardless of the scaling law of the teacher -- in fact, when the test error of the teacher does not even decay with the sample size.
format Preprint
id arxiv_https___arxiv_org_abs_2603_05691
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Improved Scaling Laws via Weak-to-Strong Generalization in Random Feature Ridge Regression
Wu, Diyuan
Chen, Lehan
Misiakiewicz, Theodor
Mondelli, Marco
Machine Learning
It is increasingly common in machine learning to use learned models to label data and then employ such data to train more capable models. The phenomenon of weak-to-strong generalization exemplifies the advantage of this two-stage procedure: a strong student is trained on imperfect labels obtained from a weak teacher, and yet the strong student outperforms the weak teacher. In this paper, we show that the potential improvement is substantial, in the sense that it affects the scaling law followed by the test error. Specifically, we consider students and teachers trained via random feature ridge regression (RFRR). Our main technical contribution is to derive a deterministic equivalent for the excess test error of the student trained on labels obtained via the teacher. Via this deterministic equivalent, we then identify regimes in which the scaling law of the student improves upon that of the teacher, unveiling that the improvement can be achieved both in bias-dominated and variance-dominated settings. Strikingly, the student may attain the minimax optimal rate regardless of the scaling law of the teacher -- in fact, when the test error of the teacher does not even decay with the sample size.
title Improved Scaling Laws via Weak-to-Strong Generalization in Random Feature Ridge Regression
topic Machine Learning
url https://arxiv.org/abs/2603.05691