Fully Unconstrained Online Learning
Abstract
We provide an online learning algorithm that obtains regret G\|w\|T(\|w\|GT) + \|w\|2 + G2 on G-Lipschitz convex losses for any comparison point w without knowing either G or \|w\|. Importantly, this matches the optimal bound G\|w\|T available with such knowledge (up to logarithmic factors), unless either \|w\| or G is so large that even G\|w\|T is roughly linear in T. Thus, it matches the optimal bound in all cases in which one can achieve sublinear regret, which arguably most "interesting" scenarios.
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