We describe a Bayesian model for simultaneous linear quantile regression at several specified quantile levels. More specifically, we propose to model the conditional distributions by using random probability measures, known as quantile pyramids, introduced by Hjort and Walker. Unlike many existing approaches, this framework allows us to specify meaningful priors on the conditional distributions, while retaining the flexibility afforded by the nonparametric error distribution formulation. Simulation studies demonstrate the flexibility of the proposed approach in estimating diverse scenarios, generally outperforming other competitive methods. We also provide conditions for posterior consistency. The method is particularly promising for modeli...
We propose a notion of conditional vector quantile function and a vector quantile regression.A condi...
The focus of this work is to develop a Bayesian framework to combine information from multiple parts...
We address a quantile dependent prior for Bayesian quantile regression. We extend the idea of the po...
Quantile regression models provide a wide picture of the conditional distributions of the response v...
Pólya trees fix partitions and use random probabilities in order to construct random probability mea...
Quantile regression models are a powerful tool for studying different points of the conditional dist...
In this paper, we consider nonparametric Bayesian variable selection in quantile regression. The Bay...
Quantile regression has recently received a great deal of attention in both theoretical and empirica...
Quantile regression, as a supplement to the mean regression, is often used when a comprehensive rel...
The classical theory of linear models focuses on the conditional mean function, i.e. the function th...
A nonparametric regression method that blends key features of piecewise polynomial quantile regressi...
This paper is a study of the application of Bayesian Exponentially Tilted Empirical Likelihood to in...
We develop a Bayesian method for nonparametric model–based quantile regression. The approach in-volv...
Bayesian inference can be extended to probability distributions defined in terms of their inverse di...
Model selection for quantile regression is often a challenging problem. In addition to the well-know...
We propose a notion of conditional vector quantile function and a vector quantile regression.A condi...
The focus of this work is to develop a Bayesian framework to combine information from multiple parts...
We address a quantile dependent prior for Bayesian quantile regression. We extend the idea of the po...
Quantile regression models provide a wide picture of the conditional distributions of the response v...
Pólya trees fix partitions and use random probabilities in order to construct random probability mea...
Quantile regression models are a powerful tool for studying different points of the conditional dist...
In this paper, we consider nonparametric Bayesian variable selection in quantile regression. The Bay...
Quantile regression has recently received a great deal of attention in both theoretical and empirica...
Quantile regression, as a supplement to the mean regression, is often used when a comprehensive rel...
The classical theory of linear models focuses on the conditional mean function, i.e. the function th...
A nonparametric regression method that blends key features of piecewise polynomial quantile regressi...
This paper is a study of the application of Bayesian Exponentially Tilted Empirical Likelihood to in...
We develop a Bayesian method for nonparametric model–based quantile regression. The approach in-volv...
Bayesian inference can be extended to probability distributions defined in terms of their inverse di...
Model selection for quantile regression is often a challenging problem. In addition to the well-know...
We propose a notion of conditional vector quantile function and a vector quantile regression.A condi...
The focus of this work is to develop a Bayesian framework to combine information from multiple parts...
We address a quantile dependent prior for Bayesian quantile regression. We extend the idea of the po...