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The Sample Complexity of Multi-Distribution Learning for VC Classes

Machine Learning 2023-07-25 v1 Machine Learning

Abstract

Multi-distribution learning is a natural generalization of PAC learning to settings with multiple data distributions. There remains a significant gap between the known upper and lower bounds for PAC-learnable classes. In particular, though we understand the sample complexity of learning a VC dimension d class on kk distributions to be O(ϵ2ln(k)(d+k)+min{ϵ1dk,ϵ4ln(k)d})O(\epsilon^{-2} \ln(k)(d + k) + \min\{\epsilon^{-1} dk, \epsilon^{-4} \ln(k) d\}), the best lower bound is Ω(ϵ2(d+kln(k)))\Omega(\epsilon^{-2}(d + k \ln(k))). We discuss recent progress on this problem and some hurdles that are fundamental to the use of game dynamics in statistical learning.

Keywords

Cite

@article{arxiv.2307.12135,
  title  = {The Sample Complexity of Multi-Distribution Learning for VC Classes},
  author = {Pranjal Awasthi and Nika Haghtalab and Eric Zhao},
  journal= {arXiv preprint arXiv:2307.12135},
  year   = {2023}
}

Comments

11 pages. Authors are ordered alphabetically. Open problem presented at the 36th Annual Conference on Learning Theory

R2 v1 2026-06-28T11:37:44.753Z