Add to ORKGQuantiles are useful characteristics of random variables that can provide substantial information on distributions compared with commonly used summary statistics such as means. In this paper, we propose a Bayesian quantile trend filtering method to estimate non-stationary trend of quantiles. We introduce general shrinkage priors to induce locally adaptive Bayesian inference on trends and mixture representation of the asymmetric Laplace likelihood. To quickly compute the posterior distribution, we develop calibrated mean-field variational approximations to guarantee that the frequentist coverage of credible intervals obtained from the approximated posterior is a specified nominal level. Simulation and empirical studies show that the proposed...
Traditional quantile estimators that are based on one or two order statistics are a common way to es...
Variational Bayes methods approximate the posterior density by a family of tractable distributions a...
This paper considers the location-scale quantile autoregression in which the location and scale para...
Estimating boundary curves has many applications such as economics, climate science, and medicine. B...
This article develops a random effects quantile regression model for panel data that allows for incr...
Non-stationary count time series characterized by features such as abrupt changes and fluctuations a...
We introduce a set of new Gibbs sampler for Bayesian analysis of quantile re-gression model. The new...
Thesis (Ph.D.)--University of Washington, 2019The need to estimate unknown functions or surfaces ari...
This paper presents a scalable approximate Bayesian method for image restoration using total variati...
We provide the first stochastic convergence rates for a family of adaptive quadrature rules used to ...
In this paper, we construct a Bayesian hierarchical model with global-local shrinkage priors for the...
This paper develops unified asymptotic distribution theory for dynamic quantile predictive regressio...
Quantile regression deals with the problem of computing robust estimators when the conditional mean ...
We present a locally adaptive nonparametric curve fitting method that operates within a fully Bayesi...
This paper extends quantile factor analysis to a probabilistic variant that incorporates regularizat...
Traditional quantile estimators that are based on one or two order statistics are a common way to es...
Variational Bayes methods approximate the posterior density by a family of tractable distributions a...
This paper considers the location-scale quantile autoregression in which the location and scale para...
Estimating boundary curves has many applications such as economics, climate science, and medicine. B...
This article develops a random effects quantile regression model for panel data that allows for incr...
Non-stationary count time series characterized by features such as abrupt changes and fluctuations a...
We introduce a set of new Gibbs sampler for Bayesian analysis of quantile re-gression model. The new...
Thesis (Ph.D.)--University of Washington, 2019The need to estimate unknown functions or surfaces ari...
This paper presents a scalable approximate Bayesian method for image restoration using total variati...
We provide the first stochastic convergence rates for a family of adaptive quadrature rules used to ...
In this paper, we construct a Bayesian hierarchical model with global-local shrinkage priors for the...
This paper develops unified asymptotic distribution theory for dynamic quantile predictive regressio...
Quantile regression deals with the problem of computing robust estimators when the conditional mean ...
We present a locally adaptive nonparametric curve fitting method that operates within a fully Bayesi...
This paper extends quantile factor analysis to a probabilistic variant that incorporates regularizat...
Traditional quantile estimators that are based on one or two order statistics are a common way to es...
Variational Bayes methods approximate the posterior density by a family of tractable distributions a...
This paper considers the location-scale quantile autoregression in which the location and scale para...