We introduce a Bayesian approach to predictive density calibration and combination that accounts for parameter uncertainty and model set incompleteness through the use of random calibration functionals and random combination weights. Building on the work of Ranjan and Gneiting (2010) and Gneiting and Ranjan (2013), we use infinite beta mixtures for the calibration. The proposed Bayesian nonparametric approach takes advantage of the exibility of Dirichlet process mixtures to achieve any continuous deformation of linearly combined predictive distributions. The inference procedure is based on combination Gibbs and slice sampling. We provide some conditions under which the proposed probabilistic calibration converges in terms of weak posterior...
Summary. This article considers Bayesian methods for density regression, allowing a random probabili...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
We introduce a Bayesian approach to predictive density calibration and combination that accounts for...
Decision-makers often consult different experts to build reliable forecasts on variables of interest...
We describe and illustrate Bayesian inference in models for density estimation using mixtures of Dir...
This thesis consists in three essays on predictive distributions, in particular their combination, c...
JSTOR is a not-for-profit service that helps scholars, researchers, and students discover, use, and ...
We build on the derivative pricing calibration literature, and propose a more general calibration mo...
We propose a Bayesian combination approach for multivariate predictive densities which relies upon a...
textabstractWe propose a Bayesian combination approach for multivariate predictive densities which r...
The paper shows that the KLD between the nonparametric and the parametric density estimates is asymp...
This dissertation explores a Bayesian nonparametric approach to mixture modeling and the use of the ...
International audienceRobust statistical data modelling under potential model mis-specification ofte...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
Summary. This article considers Bayesian methods for density regression, allowing a random probabili...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
We introduce a Bayesian approach to predictive density calibration and combination that accounts for...
Decision-makers often consult different experts to build reliable forecasts on variables of interest...
We describe and illustrate Bayesian inference in models for density estimation using mixtures of Dir...
This thesis consists in three essays on predictive distributions, in particular their combination, c...
JSTOR is a not-for-profit service that helps scholars, researchers, and students discover, use, and ...
We build on the derivative pricing calibration literature, and propose a more general calibration mo...
We propose a Bayesian combination approach for multivariate predictive densities which relies upon a...
textabstractWe propose a Bayesian combination approach for multivariate predictive densities which r...
The paper shows that the KLD between the nonparametric and the parametric density estimates is asymp...
This dissertation explores a Bayesian nonparametric approach to mixture modeling and the use of the ...
International audienceRobust statistical data modelling under potential model mis-specification ofte...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
Summary. This article considers Bayesian methods for density regression, allowing a random probabili...
The past decade has seen a remarkable development in the area of Bayesian nonparametric inference fr...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...