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Is Multi-Distribution Learning as Easy as PAC Learning: Sharp Rates with Bounded Label Noise

Machine Learning 2026-02-25 v1 Machine Learning

Abstract

Towards understanding the statistical complexity of learning from heterogeneous sources, we study the problem of multi-distribution learning. Given kk 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 1/ϵ1/\epsilon rates achievable in single-task learning extend to this regime with minimal dependence on kk. Surprisingly, we show that this is not the case. We demonstrate that learning across kk distributions inherently incurs slow rates scaling with k/ϵ2k/\epsilon^2, 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 kk. This establishes a \textit{statistical} separation between random classification noise and Massart noise, highlighting a fundamental barrier unique to learning from multiple sources.

Keywords

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}
}
R2 v1 2026-07-01T10:50:16.033Z