English

Towards Optimal Algorithms for Prediction with Expert Advice

Machine Learning 2016-07-12 v5 Computer Science and Game Theory Probability

Abstract

We study the classical problem of prediction with expert advice in the adversarial setting with a geometric stopping time. In 1965, Cover gave the optimal algorithm for the case of 2 experts. In this paper, we design the optimal algorithm, adversary and regret for the case of 3 experts. Further, we show that the optimal algorithm for 22 and 33 experts is a probability matching algorithm (analogous to Thompson sampling) against a particular randomized adversary. Remarkably, our proof shows that the probability matching algorithm is not only optimal against this particular randomized adversary, but also minimax optimal. Our analysis develops upper and lower bounds simultaneously, analogous to the primal-dual method. Our analysis of the optimal adversary goes through delicate asymptotics of the random walk of a particle between multiple walls. We use the connection we develop to random walks to derive an improved algorithm and regret bound for the case of 44 experts, and, provide a general framework for designing the optimal algorithm and adversary for an arbitrary number of experts.

Keywords

Cite

@article{arxiv.1409.3040,
  title  = {Towards Optimal Algorithms for Prediction with Expert Advice},
  author = {Nick Gravin and Yuval Peres and Balasubramanian Sivan},
  journal= {arXiv preprint arXiv:1409.3040},
  year   = {2016}
}

Comments

The latest version (accepted to SODA 2016)

R2 v1 2026-06-22T05:53:20.241Z