Online Learning with Composite Loss Functions

Ofer Dekel, Jian Ding, Tomer Koren, Yuval Peres

COLT 2014 pp. 1214-1231

/colt/2014/dekel2014colt-online/

Abstract

We study a new class of online learning problems where each of the online algorithm’s actions is assigned an adversarial value, and the loss of the algorithm at each step is a known and deterministic function of the values assigned to its recent actions. This class includes problems where the algorithm’s loss is the minimum over the recent adversarial values, the maximum over the recent values, or a linear combination of the recent values. We analyze the minimax regret of this class of problems when the algorithm receives bandit feedback, and prove that when the minimum or maximum functions are used, the minimax regret is e ( T 2=3 ) (so called hard online learning prob

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Cite

Text

Dekel et al. "Online Learning with Composite Loss Functions." Annual Conference on Computational Learning Theory, 2014.

Markdown

[Dekel et al. "Online Learning with Composite Loss Functions." Annual Conference on Computational Learning Theory, 2014.](https://mlanthology.org/colt/2014/dekel2014colt-online/)

BibTeX

@inproceedings{dekel2014colt-online,
  title     = {{Online Learning with Composite Loss Functions}},
  author    = {Dekel, Ofer and Ding, Jian and Koren, Tomer and Peres, Yuval},
  booktitle = {Annual Conference on Computational Learning Theory},
  year      = {2014},
  pages     = {1214-1231},
  url       = {https://mlanthology.org/colt/2014/dekel2014colt-online/}
}