We study the rates of convergence of the maximum likelihood
estimator (MLE) and posterior distribution in density estimation problems,
where the densities are location or location-scale mixtures of normal
distributions with the scale parameter lying between two positive numbers. The
true density is also assumed to lie in this class with the true mixing
distribution either compactly supported or having sub-Gaussian tails. We obtain
bounds for Hellinger bracketing entropies for this class, and from these
bounds, we deduce the convergence rates of (sieve) MLEs in Hellinger distance.
The rate turns out to be $(log n)^\kappa /\sqrt{n}$, where $\kappa \ge 1$ is a
constant that depends on the type of mixtures and the choice of the sieve.
Next, we consider a Dirichlet mixture of normals as a prior on the unknown
density. We estimate the prior probability of a certain Kullback-Leibler type
neighborhood and then invoke a general theorem that computes the posterior
convergence rate in terms the growth rate of the Hellinger entropy and the
concentration rate of the prior. The posterior distribution is also seen to
converge at the rate $(log n)^\kappa /\sqrt{n}$, where $\kappa$ now depends on
the tail behavior of the base measure of the Dirichlet process.
Publié le : 2001-10-14
Classification:
Bracketing,
Dirichlet mixture,
maximum likelihood,
mixture of normals,
posterior distribution,
rate of convergence,
sieve,
entropy,
62G07,
62G20
@article{1013203452,
author = {Ghosal, Subhashis and van der Vaart, Aad W.},
title = {Entropies and rates of convergence for maximum likelihood and
Bayes estimation for mixtures of normal densities},
journal = {Ann. Statist.},
volume = {29},
number = {2},
year = {2001},
pages = { 1233-1263},
language = {en},
url = {http://dml.mathdoc.fr/item/1013203452}
}
Ghosal, Subhashis; van der Vaart, Aad W. Entropies and rates of convergence for maximum likelihood and
Bayes estimation for mixtures of normal densities. Ann. Statist., Tome 29 (2001) no. 2, pp. 1233-1263. http://gdmltest.u-ga.fr/item/1013203452/