Density estimation, especially multivariate density estimation, is a fundamental problem in nonparametric inference. In the Bayesian approach, Dirichlet mixture priors are often used in practice for such problems. However, the asymptotic properties of such priors have only been studied in the univariate case. We extend the L1-consistency of Dirichlet mixutures in the multivariate density estimation setting. We obtain such a result by showing that the Kullback-Leibler property of the prior holds and that the size of the sieve in the parameter space in terms of L1-metric entropy is not larger than the order of n. However, it seems that the usual technique of choosing a sieve by controlling prior probabilities is unable to lead to a useful bou...
A Dirichlet mixture of normal densities is a useful choice for a prior distribution on densities in ...
We study the rates of convergence of the maximum likelihood esti-mator (MLE) and posterior distribut...
In this paper we discuss consistency of the posterior distribution in cases where the Kullback-Leibl...
AbstractDensity estimation, especially multivariate density estimation, is a fundamental problem in ...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
We establish that the Dirichlet location scale mixture of normal priors and the logistic Gaussian pr...
We study the rates of convergence of the posterior distribution for Bayesian density estimation with...
International audienceAbstract In this paper we discuss consistency of the posterior distribution in...
this paper, we settle this issue in affirmative. Running Head. Consistency of Dirichlet mixtures
The use of a finite dimensional Dirichlet prior in the finite normal mixture model has the effect of...
A Dirichlet mixture of exponential power distributions, as a prior on densities supported on the rea...
Most of the currently used discrete nonparametric priors are, with the exception of the Dirichlet pr...
We describe and illustrate Bayesian inference in models for density estimation using mixtures of Dir...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a ...
A Dirichlet mixture of normal densities is a useful choice for a prior distribution on densities in ...
We study the rates of convergence of the maximum likelihood esti-mator (MLE) and posterior distribut...
In this paper we discuss consistency of the posterior distribution in cases where the Kullback-Leibl...
AbstractDensity estimation, especially multivariate density estimation, is a fundamental problem in ...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
We establish that the Dirichlet location scale mixture of normal priors and the logistic Gaussian pr...
We study the rates of convergence of the posterior distribution for Bayesian density estimation with...
International audienceAbstract In this paper we discuss consistency of the posterior distribution in...
this paper, we settle this issue in affirmative. Running Head. Consistency of Dirichlet mixtures
The use of a finite dimensional Dirichlet prior in the finite normal mixture model has the effect of...
A Dirichlet mixture of exponential power distributions, as a prior on densities supported on the rea...
Most of the currently used discrete nonparametric priors are, with the exception of the Dirichlet pr...
We describe and illustrate Bayesian inference in models for density estimation using mixtures of Dir...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a ...
A Dirichlet mixture of normal densities is a useful choice for a prior distribution on densities in ...
We study the rates of convergence of the maximum likelihood esti-mator (MLE) and posterior distribut...
In this paper we discuss consistency of the posterior distribution in cases where the Kullback-Leibl...