Sharper bounds for online learning of smooth functions of a single variable

Abstract

We investigate the generalization of the mistake-bound model to continuous real-valued single variable functions. Let Fq be the class of absolutely continuous functions f: [0, 1] → R with ||f'||q 1, and define optp(Fq) as the best possible bound on the worst-case sum of the pth powers of the absolute prediction errors over any number of trials. Kimber and Long (Theoretical Computer Science, 1995) proved for q 2 that optp(Fq) = 1 when p 2 and optp(Fq) = ∞ when p = 1. For 1 < p < 2 with p = 1+ε, the only known bound was optp(Fq) = O(ε-1) from the same paper. We show for all ε ∈ (0, 1) and q 2 that opt1+ε(Fq) = (ε-12), where the constants in the bound do not depend on q. We also show that opt1+ε(F∞) = (ε-12).