Online Learning of Smooth Functions

Abstract

In this paper, we study the online learning of real-valued functions where the hidden function is known to have certain smoothness properties. Specifically, for q 1, let Fq be the class of absolutely continuous functions f: [0,1] R such that \|f'\|q 1. For q 1 and d ∈ Z+, let Fq,d be the class of functions f: [0,1]d R such that any function g: [0,1] R formed by fixing all but one parameter of f is in Fq. For any class of real-valued functions F and p>0, let optp( F) be the best upper bound on the sum of pth powers of absolute prediction errors that a learner can guarantee in the worst case. In the single-variable setup, we find new bounds for optp( Fq) that are sharp up to a constant factor. We show for all ∈ (0, 1) that opt1+(F∞) = (-12) and opt1+(Fq) = (-12) for all q 2. We also show for ∈ (0,1) that opt2( F1+)=(-1). In addition, we obtain new exact results by proving that optp( Fq)=1 for q ∈ (1,2) and p 2+1q-1. In the multi-variable setup, we establish inequalities relating optp( Fq,d) to optp( Fq) and show that optp( F∞,d) is infinite when p<d and finite when p>d. We also obtain sharp bounds on learning F∞,d for p < d when the number of trials is bounded.