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Fully Unconstrained Online Learning

Machine Learning 2024-06-03 v1 Optimization and Control Machine Learning

Abstract

We provide an online learning algorithm that obtains regret GwTlog(wGT)+w2+G2G\|w_\star\|\sqrt{T\log(\|w_\star\|G\sqrt{T})} + \|w_\star\|^2 + G^2 on GG-Lipschitz convex losses for any comparison point ww_\star without knowing either GG or w\|w_\star\|. Importantly, this matches the optimal bound GwTG\|w_\star\|\sqrt{T} available with such knowledge (up to logarithmic factors), unless either w\|w_\star\| or GG is so large that even GwTG\|w_\star\|\sqrt{T} is roughly linear in TT. Thus, it matches the optimal bound in all cases in which one can achieve sublinear regret, which arguably most "interesting" scenarios.

Keywords

Cite

@article{arxiv.2405.20540,
  title  = {Fully Unconstrained Online Learning},
  author = {Ashok Cutkosky and Zakaria Mhammedi},
  journal= {arXiv preprint arXiv:2405.20540},
  year   = {2024}
}
R2 v1 2026-06-28T16:47:58.414Z