Bi-s*-Concave Distributions

Abstract

We introduce new shape-constrained classes of distribution functions on R, the bi-s*-concave classes. In parallel to results of D\"umbgen, Kolesnyk, and Wilke (2017) for what they called the class of bi-log-concave distribution functions, we show that every s-concave density f has a bi-s*-concave distribution function F for s*≤ s/(s+1). Confidence bands building on existing nonparametric bands, but accounting for the shape constraint of bi-s*-concavity, are also considered. The new bands extend those developed by D\"umbgen et al. (2017) for the constraint of bi-log-concavity. We also make connections between bi-s*-concavity and finiteness of the Cs\"orgo - R\'ev\'esz constant of F which plays an important role in the theory of quantile processes.