<p>In spite of the recent surge of interest in quantile regression, joint estimation of linear quantile planes remains a great challenge in statistics and econometrics. We propose a novel parameterization that characterizes any collection of noncrossing quantile planes over arbitrarily shaped convex predictor domains in any dimension by means of unconstrained scalar, vector and function valued parameters. Statistical models based on this parameterization inherit a fast computation of the likelihood function, enabling penalized likelihood or Bayesian approaches to model fitting. We introduce a complete Bayesian methodology by using Gaussian process prior distributions on the function valued parameters and develop a robust and efficient Marko...
Quantile regression is a powerful tool for learning the relationship between a response variable and...
Quantile regression refers to the process of estimating the quantiles of a conditional distribution ...
Quantile regression refers to the process of estimating the quantiles of a conditional distribution ...
Multivariate quantiles have been defined by a number of researchers and can be estimated by differen...
We introduce a Bayesian semiparametric methodology for joint quantile regression with linearity and ...
We describe a Bayesian model for simultaneous linear quantile regression at several specified quanti...
Quantile regression, as a supplement to the mean regression, is often used when a comprehensive rel...
Quantile and M-quantile regression have been applied successfully to small area estimation within th...
Quantile regression has recently received a great deal of attention in both theoretical and empirica...
Quantile regression models are a powerful tool for studying different points of the conditional dist...
Lp–quantiles generalise quantiles and expectiles to account for the whole distribution of the random...
This paper is a study of the application of Bayesian Exponentially Tilted Empirical Likelihood to in...
In this paper, we present new multivariate quantile distributions and utilise likelihood-free Bayesi...
Quantile regression deals with the problem of computing robust estimators when the conditional mean ...
We address a quantile dependent prior for Bayesian quantile regression. We extend the idea of the po...
Quantile regression is a powerful tool for learning the relationship between a response variable and...
Quantile regression refers to the process of estimating the quantiles of a conditional distribution ...
Quantile regression refers to the process of estimating the quantiles of a conditional distribution ...
Multivariate quantiles have been defined by a number of researchers and can be estimated by differen...
We introduce a Bayesian semiparametric methodology for joint quantile regression with linearity and ...
We describe a Bayesian model for simultaneous linear quantile regression at several specified quanti...
Quantile regression, as a supplement to the mean regression, is often used when a comprehensive rel...
Quantile and M-quantile regression have been applied successfully to small area estimation within th...
Quantile regression has recently received a great deal of attention in both theoretical and empirica...
Quantile regression models are a powerful tool for studying different points of the conditional dist...
Lp–quantiles generalise quantiles and expectiles to account for the whole distribution of the random...
This paper is a study of the application of Bayesian Exponentially Tilted Empirical Likelihood to in...
In this paper, we present new multivariate quantile distributions and utilise likelihood-free Bayesi...
Quantile regression deals with the problem of computing robust estimators when the conditional mean ...
We address a quantile dependent prior for Bayesian quantile regression. We extend the idea of the po...
Quantile regression is a powerful tool for learning the relationship between a response variable and...
Quantile regression refers to the process of estimating the quantiles of a conditional distribution ...
Quantile regression refers to the process of estimating the quantiles of a conditional distribution ...