Tractable Instances of Bilinear Maximization: Implementing LinUCB on Ellipsoids
Abstract
We consider the maximization of x θ over (x,θ) ∈ X × , with X ⊂ Rd convex and ⊂ Rd an ellipsoid. This problem is fundamental in linear bandits, as the learner must solve it at every time step using optimistic algorithms. We first show that for some sets X e.g. p balls with p>2, no efficient algorithms exist unless P = NP. We then provide two novel algorithms solving this problem efficiently when X is a centered ellipsoid. Our findings provide the first known method to implement optimistic algorithms for linear bandits in high dimensions.
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