We derive rates of contraction of posterior distributions on nonparametric or semiparametric models based on Gaussian processes. The rate of contraction is shown to depend on the position of the true parameter relative to the reproducing kernel Hilbert space of the Gaussian process and the small ball probabilities of the Gaussian process. We determine these quantities for a range of examples of Gaussian priors and in several statistical settings. For instance, we consider the rate of contraction of the posterior distribution based on sampling from a smooth density model when the prior models the log density as a (fractionally integrated) Brownian motion. We also consider regression with Gaussian errors and smooth classification under a logi...
In this paper, we propose a general method to derive an upper bound for the contraction rate of the ...
Consider binary observations whose response probability is an unknown smooth function of a set of co...
We study random series priors for estimating a functional parameter f∈L2[0,1]. We show that with a s...
We derive rates of contraction of posterior distributions on nonparametric or semiparametric models ...
The goal of statistics is to draw sensible conclusions from data. In mathematical statistics, observ...
We use rescaled Gaussian processes as prior models for functional parameters in nonparametric statis...
We study posterior contraction rates for a class of deep Gaussian process priors applied to the nonp...
We provide posterior contraction rates for constrained deep Gaussian processes in non-parametric den...
We review definitions and properties of reproducing kernel Hilbert spaces attached to Gaussian varia...
Diffusions have many applications in science and can be described with a stochastic differential equ...
This paper considers the posterior contraction of non-parametric Bayesian inference on non-homogeneo...
We consider a family of infinite dimensional product measures with tails between Gaussian and expone...
We study the theoretical properties of a variational Bayes method in the Gaussian Process regression...
In this paper, we propose a general method to derive an upper bound for the contraction rate of the ...
Consider binary observations whose response probability is an unknown smooth function of a set of co...
We study random series priors for estimating a functional parameter f∈L2[0,1]. We show that with a s...
We derive rates of contraction of posterior distributions on nonparametric or semiparametric models ...
The goal of statistics is to draw sensible conclusions from data. In mathematical statistics, observ...
We use rescaled Gaussian processes as prior models for functional parameters in nonparametric statis...
We study posterior contraction rates for a class of deep Gaussian process priors applied to the nonp...
We provide posterior contraction rates for constrained deep Gaussian processes in non-parametric den...
We review definitions and properties of reproducing kernel Hilbert spaces attached to Gaussian varia...
Diffusions have many applications in science and can be described with a stochastic differential equ...
This paper considers the posterior contraction of non-parametric Bayesian inference on non-homogeneo...
We consider a family of infinite dimensional product measures with tails between Gaussian and expone...
We study the theoretical properties of a variational Bayes method in the Gaussian Process regression...
In this paper, we propose a general method to derive an upper bound for the contraction rate of the ...
Consider binary observations whose response probability is an unknown smooth function of a set of co...
We study random series priors for estimating a functional parameter f∈L2[0,1]. We show that with a s...