We consider the problem of estimating a compactly supported density taking a Bayesian nonparametric approach. We define a Dirichlet mixture prior that, while selecting piecewise constant densities, has full support on the Hellinger metric space of all commonly dominated probability measures on a known bounded interval. We derive pointwise rates of convergence for the posterior expected density by studying the speed at which the posterior mass accumulates on shrinking Hellinger eighbourhoods of the sampling density. If the data are sampled from a strictly positive, \alpha-Holderian density, with \alpha ∈(0, 1], then the optimal convergence rate n^{-\alpha/(2\alpha+1)} is obtained up to a logarithmic factor. Smoothing histograms by polygons, ...
A Dirichlet mixture of exponential power distributions, as a prior on densities supported on the rea...
Rates of convergence of Bayesian nonparametric procedures are expressed as the maximum between two r...
We study convergence rates of Bayesian density estimators based on finite location-scale mixtures of...
We consider the problem of estimating a compactly supported density taking a Bayesian nonparametric ...
We consider Bayesian density estimation for compactly supported densities using Bernstein mixtures o...
We study the rates of convergence of the posterior distribution for Bayesian density estimation with...
We study the rate of convergence of posterior distributions in density estimation problems for log-d...
We study the rate of convergence of posterior distributions in density estimation problems for log-d...
In this work we investigate the asymptotic properties of nonparametric bayesian mixtures of Betas fo...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a ...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a p...
In this paper, we investigate the asymptotic properties of nonparametric Bayesian mixtures of Betas ...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a p...
In this work we consider estimating densities that are location or location-scale mixtures of kernel...
We study the rates of convergence of the maximum likelihood esti-mator (MLE) and posterior distribut...
A Dirichlet mixture of exponential power distributions, as a prior on densities supported on the rea...
Rates of convergence of Bayesian nonparametric procedures are expressed as the maximum between two r...
We study convergence rates of Bayesian density estimators based on finite location-scale mixtures of...
We consider the problem of estimating a compactly supported density taking a Bayesian nonparametric ...
We consider Bayesian density estimation for compactly supported densities using Bernstein mixtures o...
We study the rates of convergence of the posterior distribution for Bayesian density estimation with...
We study the rate of convergence of posterior distributions in density estimation problems for log-d...
We study the rate of convergence of posterior distributions in density estimation problems for log-d...
In this work we investigate the asymptotic properties of nonparametric bayesian mixtures of Betas fo...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a ...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a p...
In this paper, we investigate the asymptotic properties of nonparametric Bayesian mixtures of Betas ...
We consider Bayesian nonparametric density estimation with a Dirichlet process kernel mixture as a p...
In this work we consider estimating densities that are location or location-scale mixtures of kernel...
We study the rates of convergence of the maximum likelihood esti-mator (MLE) and posterior distribut...
A Dirichlet mixture of exponential power distributions, as a prior on densities supported on the rea...
Rates of convergence of Bayesian nonparametric procedures are expressed as the maximum between two r...
We study convergence rates of Bayesian density estimators based on finite location-scale mixtures of...