Generalized Mixability via Entropic Duality

Abstract

Mixability is a property of a loss which characterizes when fast convergence is possible in the game of prediction with expert advice. We show that a key property of mixability generalizes, and the exp and log operations present in the usual theory are not as special as one might have thought. In doing this we introduce a more general notion of -mixability where is a general entropy (, any convex function on probabilities). We show how a property shared by the convex dual of any such entropy yields a natural algorithm (the minimizer of a regret bound) which, analogous to the classical aggregating algorithm, is guaranteed a constant regret when used with -mixable losses. We characterize precisely which have -mixable losses and put forward a number of conjectures about the optimality and relationships between different choices of entropy.