The classical Bayesian posterior arises naturally as the unique solution of several different optimization problems, without the necessity of interpreting data as conditional probabilities and then using Bayes' Theorem. For example, the classical Bayesian posterior is the unique posterior that minimizes the loss of Shannon information in combining the prior and the likelihood distributions. These results, direct corollaries of recent results about conflations of probability distributions, reinforce the use of Bayesian posteriors, and may help partially reconcile some of the differences between classical and Bayesian statistics
The posterior probabilities available under standard Bayesian statistics are computable, apply to sm...
peer reviewedWe observe n independent random variables with joint distribution P and pretend that th...
Central in Bayesian statistics is Bayes theorem which can be written as follows jx fxj Given th...
The classical Bayesian posterior arises naturally as the unique solution of several different optimi...
It is well known that the classical Bayesian posterior arises naturally as the unique solution of di...
Although teaching Bayes’ theorem is popular, the standard approach—targeting posterior distributions...
In this paper, we consider the Bayesian posterior distribution as the solution to a minimization ru...
In this paper, we consider the Bayesian posterior distribution as the solution to a minimization rul...
This paper is concerned with the construction of prior probability measures for parametric families ...
In the Bayes paradigm and for a given loss function, we propose the construction of a new type of po...
Bayesian analysts use a formal model, Bayes’ theorem to learn from their data in contrast to non-Bay...
What is a good prior? Actual prior knowledge should be used, but for complex models this is often no...
In 1930, Fisher presented his fiducial argument as a solution to the "fundamen- tally false and devo...
Introduction Central in Bayesian statistics is Bayes' theorem, which can be written as follows...
The emphasis in this work is on derivation of optimal Bayes inferences and designs in relatively une...
The posterior probabilities available under standard Bayesian statistics are computable, apply to sm...
peer reviewedWe observe n independent random variables with joint distribution P and pretend that th...
Central in Bayesian statistics is Bayes theorem which can be written as follows jx fxj Given th...
The classical Bayesian posterior arises naturally as the unique solution of several different optimi...
It is well known that the classical Bayesian posterior arises naturally as the unique solution of di...
Although teaching Bayes’ theorem is popular, the standard approach—targeting posterior distributions...
In this paper, we consider the Bayesian posterior distribution as the solution to a minimization ru...
In this paper, we consider the Bayesian posterior distribution as the solution to a minimization rul...
This paper is concerned with the construction of prior probability measures for parametric families ...
In the Bayes paradigm and for a given loss function, we propose the construction of a new type of po...
Bayesian analysts use a formal model, Bayes’ theorem to learn from their data in contrast to non-Bay...
What is a good prior? Actual prior knowledge should be used, but for complex models this is often no...
In 1930, Fisher presented his fiducial argument as a solution to the "fundamen- tally false and devo...
Introduction Central in Bayesian statistics is Bayes' theorem, which can be written as follows...
The emphasis in this work is on derivation of optimal Bayes inferences and designs in relatively une...
The posterior probabilities available under standard Bayesian statistics are computable, apply to sm...
peer reviewedWe observe n independent random variables with joint distribution P and pretend that th...
Central in Bayesian statistics is Bayes theorem which can be written as follows jx fxj Given th...