Mixture models for density estimation provide a very useful set up
for the Bayesian or the maximum likelihood approach.For a density on the unit
interval, mixtures of beta densities form a flexible model. The class of
Bernstein densities is a much smaller subclass of the beta mixtures defined by
Bernstein polynomials, which can approximate any continuous density. A
Bernstein polynomial prior is obtained by putting a prior distribution on the
class of Bernstein densities. The posterior distribution of a Bernstein
polynomial prior is consistent under very general conditions. In this article,
we present some results on the rate of convergence of the posterior
distribution. If the underlying distribution generating the data is itself a
Bernstein density, then we show that the posterior distribution converges at
“nearly parametric rate” $(log n) /\sqrt{n}$ for the Hellinger
distance. If the true density is not of the Bernstein type, we show that the
posterior converges at a rate $n^{1/3}(log n)^{5/6}$ provided that the true
density is twice differentiable and bounded away from 0. Similar rates are also
obtained for sieve maximum likelihood estimates.These rates are inferior to the
pointwise convergence rate of a kernel type estimator.We show that the Bayesian
bootstrap method gives a proxy for the posterior distribution and has a
convergence rate at par with that of the kernel estimator.
Publié le : 2001-10-14
Classification:
Bayesian bootstrap,
Bernstein polynomial,
entropy,
maximum likelihood estimate,
mixture of beta,
posterior distribution,
rate of convergence,
sieve,
strong approximation,
62G07,
62G20
@article{1013203453,
author = {Ghosal, Subhashis},
title = {Convergence rates for density estimation with Bernstein
polynomials},
journal = {Ann. Statist.},
volume = {29},
number = {2},
year = {2001},
pages = { 1264-1280},
language = {en},
url = {http://dml.mathdoc.fr/item/1013203453}
}
Ghosal, Subhashis. Convergence rates for density estimation with Bernstein
polynomials. Ann. Statist., Tome 29 (2001) no. 2, pp. 1264-1280. http://gdmltest.u-ga.fr/item/1013203453/