Minimax Regret for Bandit Convex Optimisation of Ridge Functions

Abstract

We analyse adversarial bandit convex optimisation with an adversary that is restricted to playing functions of the form ft(x) = gt( x, θ) for convex gt : R R and unknown θ ∈ Rd that is homogeneous over time. We provide a short information-theoretic proof that the minimax regret is at most O(d n (n diam( K))) where n is the number of interactions, d the dimension and diam( K) is the diameter of the constraint set.

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