Birgé, Lucien Estimation of unimodal densities without smoothness assumptions. (English) Zbl 0888.62033 Ann. Stat. 25, No. 3, 970-981 (1997). Summary: The Grenander estimator [U. Grenander, Abstract inference. (1981; Zbl 0505.62069)] of a decreasing density, which is defined as the derivative of the concave envelope of the empirical c.d.f., is known to be a very good estimator of an unknown decreasing density on the half-line \(\mathbb{R}^+\) when this density is not assumed to be smooth. It is indeed the maximum likelihood estimator and one can get precise upper bounds for its risk when the loss is measured by the \(\mathbb{L}^1\)-distance between densities. Moreover, if one restricts oneself to the compact subsets of decreasing densities bounded by \(H\) with support on \([0, L]\) the risk of this estimator is within a fixed factor of the minimax risk. The same is true if one deals with the maximum likelihood estimator for unimodal densities with known mode. When the mode is unknown, the maximum likelihood estimator does not exist any more. We provide a general purpose estimator (together with a computational algorithm) for estimating nonsmooth unimodal densities. Its risk is the same as the risk of the Grenander estimator based on the knowledge of the true mode plus some lower order term. It can also cope with small departures from unimodality. Cited in 2 ReviewsCited in 38 Documents MSC: 62G07 Density estimation 62G05 Nonparametric estimation 41A25 Rate of convergence, degree of approximation Keywords:curve estimation; spatial adaptation; Grenander estimator; unimodal densities Citations:Zbl 0505.62069 × Cite Format Result Cite Review PDF Full Text: DOI