Add to ORKGUnder local DeRobertis (LDR) separation measures, the posterior distances between two densities is the same as between the prior densities. Like Kullback - Leibler separation they also are additive under factorization. These two properties allow us the prove that the precise specification of the prior will not be critical with respect to the variation distance on the posteriors under the following conditions. The genuine and approximating prior need to be similarly rough, the approximating prior has concentrated on a small ball on the margin of interest, not on the boundary of the probability space, and the approximating prior has similar or fatter tails to the genuine prior. Robustness then follows for all likelihoods, even ones that...
In a typical inferential problem, the conclusion reached by a Bayesian statistician depends on three...
The practical implementation of Bayesian inference requires numerical approximation when closed-form...
This paper introduces a new neural network based prior for real valued functions on $\mathbb R^d$ wh...
Under local DeRobertis separation measures, the posterior distances between two densities is the sam...
AbstractRecent results concerning the instability of Bayes Factor search over Bayesian Networks (BN’...
Here a new class of local separation measures over prior densities is studied and their usefulness ...
Under a new family of separations the distance between two posterior densities is the same as the di...
Recent results concerning the instability of Bayes Factor search over Bayesian Networks (BN's) lead ...
Under a new family of separations the distance between two poste-rior densities is the same as the d...
peer reviewedWe observe n independent random variables with joint distribution P and pretend that th...
The Bayesian treatment of neural networks dictates that a prior distribution is specified over their...
In Chapter 2, the robustness of Bayes analysis with reference to conjugate prior classes is discusse...
Deep neural networks have bested notable benchmarks across computer vision, reinforcement learning, ...
With the advent of high-performance computing, Bayesian methods are becoming increasingly popular to...
We propose a Bayesian framework for regression problems, which covers areas which are usually dealt ...
In a typical inferential problem, the conclusion reached by a Bayesian statistician depends on three...
The practical implementation of Bayesian inference requires numerical approximation when closed-form...
This paper introduces a new neural network based prior for real valued functions on $\mathbb R^d$ wh...
Under local DeRobertis separation measures, the posterior distances between two densities is the sam...
AbstractRecent results concerning the instability of Bayes Factor search over Bayesian Networks (BN’...
Here a new class of local separation measures over prior densities is studied and their usefulness ...
Under a new family of separations the distance between two posterior densities is the same as the di...
Recent results concerning the instability of Bayes Factor search over Bayesian Networks (BN's) lead ...
Under a new family of separations the distance between two poste-rior densities is the same as the d...
peer reviewedWe observe n independent random variables with joint distribution P and pretend that th...
The Bayesian treatment of neural networks dictates that a prior distribution is specified over their...
In Chapter 2, the robustness of Bayes analysis with reference to conjugate prior classes is discusse...
Deep neural networks have bested notable benchmarks across computer vision, reinforcement learning, ...
With the advent of high-performance computing, Bayesian methods are becoming increasingly popular to...
We propose a Bayesian framework for regression problems, which covers areas which are usually dealt ...
In a typical inferential problem, the conclusion reached by a Bayesian statistician depends on three...
The practical implementation of Bayesian inference requires numerical approximation when closed-form...
This paper introduces a new neural network based prior for real valued functions on $\mathbb R^d$ wh...