In the Bayes paradigm and for a given loss function, we propose the construction of a new type of posterior distributions, that extends the classical Bayes one, for estimating the law of an $n$-sample. The loss functions we have in mind are based on the total variation and Hellinger distances as well as some L_j-ones. We prove that, with a probability close to one, this new posterior distribution concentrates its mass in a neighbourhood of the law of the data, for the chosen loss function, provided that this law belongs to the support of the prior or, at least, lies close enough to it. We therefore establish that the new posterior distribution enjoys some robustness properties with respect to a possible misspecification of the prior, or mo...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
Under mild conditions, strong consistency of the Bayes estimator of the density is proved. Moreover,...
peer reviewedIn the Bayes paradigm and for a given loss function, we propose the construction of a n...
We observe n independent random variables with joint distribution P and pretend that they are i.i.d....
This paper presents a new asymptotic approach to study the robustness of Bayesian inference to chang...
this paper, this assessment is paramount given that we are concerned with a goodness of fit perspect...
In order to deal with mild deviations from the assumed parametric model, we propose a procedure for ...
This paper introduces a new family of local density separations for assessing robustness of finite-di...
In this paper we discuss consistency of the posterior distribution in cases where the Kullback-Leibl...
In this paper, we adopt a nonparametric Bayesian approach and investigate the asymptotic behavior of...
We review the Bayesian theory of semiparametric inference following Bickel and Kleijn (2012) [5] and...
In this paper, we consider the well known problem of estimating a density function under qualitative...
Summary: We consider estimating a probability density p based on a random sample from this density b...
In this paper we obtain convergence bounds for the concentration of Bayesian posterior distributions...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
Under mild conditions, strong consistency of the Bayes estimator of the density is proved. Moreover,...
peer reviewedIn the Bayes paradigm and for a given loss function, we propose the construction of a n...
We observe n independent random variables with joint distribution P and pretend that they are i.i.d....
This paper presents a new asymptotic approach to study the robustness of Bayesian inference to chang...
this paper, this assessment is paramount given that we are concerned with a goodness of fit perspect...
In order to deal with mild deviations from the assumed parametric model, we propose a procedure for ...
This paper introduces a new family of local density separations for assessing robustness of finite-di...
In this paper we discuss consistency of the posterior distribution in cases where the Kullback-Leibl...
In this paper, we adopt a nonparametric Bayesian approach and investigate the asymptotic behavior of...
We review the Bayesian theory of semiparametric inference following Bickel and Kleijn (2012) [5] and...
In this paper, we consider the well known problem of estimating a density function under qualitative...
Summary: We consider estimating a probability density p based on a random sample from this density b...
In this paper we obtain convergence bounds for the concentration of Bayesian posterior distributions...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
Under mild conditions, strong consistency of the Bayes estimator of the density is proved. Moreover,...