On the tails of log-concave density estimators

Abstract

It is shown that the nonparametric maximum likelihood estimator of a univariate log-concave probability density satisfies desirable consistency properties in the tail regions. Specifically, let P and f denote the true underlying distribution and density, respectively. If fn is the estimated log-concave density, and n = fn, then we specify sequences (bn)n∈ N such that P([bn,∞)) 0 at a specific speed, ensuring that the absolute errors or absolute relative errors of fn, \ n and n' converge to zero uniformly on sets [a, bn]. The main tools, besides characterizations of fn, are exponential and maximal inequalities for truncated moments of log-concave distributions, which are of independent interest.