Bandit Convex Optimization: sqrt{T} Regret in One Dimension

  • Sébastien Bubeck ,
  • Ofer Dekel ,
  • Tomer Koren ,
  • Yuval Peres

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论文与出版物

We analyze the minimax regret of the adversarial bandit convex optimization problem. Focusing on the one-dimensional case, we prove that the minimax regret is Θ˜(√T) and partially resolve a decade-old open problem. Our analysis is non-constructive, as we do not present a concrete algorithm that attains this regret rate. Instead, we use minimax duality to reduce the problem to a Bayesian setting, where the convex loss functions are drawn from a worst-case distribution, and then we solve the Bayesian version of the problem with a variant of Thompson Sampling. Our analysis features a novel use of convexity, formalized as a “local-to-global” property of convex functions, that may be of independent interest.