We consider the problem of estimating the response function in a random design regression model with Gaussian errors. We confine ourselves to regression functions with a known degree of smoothness.We investigate the asymptotic behaviour of the risk (using integrated squared error loss) of the posterior mean resulting from independent normal priors on the coefficients in a series expansion of the regression function through an orthogonal basis. We show that the Bayes’ estimator corresponding to any product Gaussian prior supported on the parameter space involved cannot attain the optimal minimax rate over ellipsoids containing the true value of the parameter. This result provides support for a recently posed “conjecture” according to which...
The problem of estimating a regression function based on a regression model with (known) random desi...
We study Bayes procedures for nonparametric regression problems with Gaussian errors, giving conditi...
Previous works on location and location-scale mixtures of normals have shown different upper bounds ...
We consider the problem of estimating the response function in a random design regression model with...
The problem of estimating the conditional mean function in a nonparametric regression model is one o...
In this note the problem of nonparametric regression function estimation in a random design regressi...
In Bayesian nonparametric models, Gaussian processes provide a popular prior choice for regression f...
We consider the problem of estimating an unknown regression function when the design is random with...
The problem of estimating a regression function based on a regression model with (known) random desi...
We study the Bayesian approach to nonparametric function estimation problems such as nonparametric r...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
The minimax risks are compared in the random and regular design models. In the scale of large deviat...
We study Bayes procedures for nonparametric regression problems with Gaussian errors, giving conditi...
We review the Bayesian theory of semiparametric inference following Bickel and Kleijn (2012) [5] and...
The goal of statistics is to draw sensible conclusions from data. In mathematical statistics, observ...
The problem of estimating a regression function based on a regression model with (known) random desi...
We study Bayes procedures for nonparametric regression problems with Gaussian errors, giving conditi...
Previous works on location and location-scale mixtures of normals have shown different upper bounds ...
We consider the problem of estimating the response function in a random design regression model with...
The problem of estimating the conditional mean function in a nonparametric regression model is one o...
In this note the problem of nonparametric regression function estimation in a random design regressi...
In Bayesian nonparametric models, Gaussian processes provide a popular prior choice for regression f...
We consider the problem of estimating an unknown regression function when the design is random with...
The problem of estimating a regression function based on a regression model with (known) random desi...
We study the Bayesian approach to nonparametric function estimation problems such as nonparametric r...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
The minimax risks are compared in the random and regular design models. In the scale of large deviat...
We study Bayes procedures for nonparametric regression problems with Gaussian errors, giving conditi...
We review the Bayesian theory of semiparametric inference following Bickel and Kleijn (2012) [5] and...
The goal of statistics is to draw sensible conclusions from data. In mathematical statistics, observ...
The problem of estimating a regression function based on a regression model with (known) random desi...
We study Bayes procedures for nonparametric regression problems with Gaussian errors, giving conditi...
Previous works on location and location-scale mixtures of normals have shown different upper bounds ...