Is Multi-Distribution Learning as Easy as PAC Learning: Sharp Rates with Bounded Label Noise
Abstract
Towards understanding the statistical complexity of learning from heterogeneous sources, we study the problem of multi-distribution learning. Given data sources, the goal is to output a classifier for each source by exploiting shared structure to reduce sample complexity. We focus on the bounded label noise setting to determine whether the fast rates achievable in single-task learning extend to this regime with minimal dependence on . Surprisingly, we show that this is not the case. We demonstrate that learning across distributions inherently incurs slow rates scaling with , even under constant noise levels, unless each distribution is learned separately. A key technical contribution is a structured hypothesis-testing framework that captures the statistical cost of certifying near-optimality under bounded noise-a cost we show is unavoidable in the multi-distribution setting. Finally, we prove that when competing with the stronger benchmark of each distribution's optimal Bayes error, the sample complexity incurs a \textit{multiplicative} penalty in . This establishes a \textit{statistical} separation between random classification noise and Massart noise, highlighting a fundamental barrier unique to learning from multiple sources.
Cite
@article{arxiv.2602.21039,
title = {Is Multi-Distribution Learning as Easy as PAC Learning: Sharp Rates with Bounded Label Noise},
author = {Rafael Hanashiro and Abhishek Shetty and Patrick Jaillet},
journal= {arXiv preprint arXiv:2602.21039},
year = {2026}
}