The Neyman-Pearson lemma for convex expectations

Abstract

We study the Neyman-Pearson theory for convex expectations (convex risk measures) on L∞(μ). Without assuming that the level sets of penalty functions are weakly compact, a new approach different from the convex duality method is proposed to find a representative pair (Q ,P) such that the optimal tests are just the classical Neyman-Pearson tests between the representative probabilities Q and P. The key observation is that the feasible test set is compact in the weak topology by a generalized result of Banach-Alaoglu theorem. Then the minimax theorem can be applied and the representative probability Q is found first. Secondly, under the probability Q, we find the representative probability measure P by solving a dual problem. Finally, we apply our results to a shortfall risk minimizing problem in an incomplete financial market.