<p>Jointly achieving parsimony and good predictive power in high dimensions is a main challenge in statistics. Nonlocal priors (NLPs) possess appealing properties for model choice, but their use for estimation has not been studied in detail. We show that for regular models NLP-based Bayesian model averaging (BMA) shrink spurious parameters either at fast polynomial or quasi-exponential rates as the sample size <i>n</i> increases, while nonspurious parameter estimates are not shrunk. We extend some results to linear models with dimension <i>p</i> growing with <i>n</i>. Coupled with our theoretical investigations, we outline the constructive representation of NLPs as mixtures of truncated distributions that enables simple posterior sampling a...
The horseshoe prior has proven to be a noteworthy alternative for sparse Bayesian estimation, but ha...
In this paper, we considered a Bayesian hierarchical method using the hyper product inverse moment p...
Abstract: We propose a generalized double Pareto prior for Bayesian shrinkage estimation and inferen...
Jointly achieving parsimony and good predictive power in high dimensions is a main challenge in stat...
Sparsity is a standard structural assumption that is made while modeling high-dimensional statistica...
<p>Tremendous progress has been made in the last two decades in the area of high-dimensional regress...
This paper reviews global-local prior distributions for Bayesian inference in high-dimensional regre...
Thesis (Ph.D.)--University of Washington, 2023Choosing a statistical model and accounting for uncert...
The horseshoe prior has proven to be a noteworthy alternative for sparse Bayesian estimation, but as...
High dimensional vector autoregressive (VAR) models require a large number of parameters to be esti...
Different challenging issues have emerged in recent years regarding the analysis of high dimensional...
We consider sparse Bayesian estimation in the classical multivariate linear regression model with p ...
Abstract from short.pdf file.Dissertation supervisors: Dr. Marco A. R. Ferreira and Dr. Tieming Ji.I...
<p>Bayesian variable selection often assumes normality, but the effects of model misspecification ar...
With advancements in genomic technologies, it is common to have two high-dimensional datasets, each ...
The horseshoe prior has proven to be a noteworthy alternative for sparse Bayesian estimation, but ha...
In this paper, we considered a Bayesian hierarchical method using the hyper product inverse moment p...
Abstract: We propose a generalized double Pareto prior for Bayesian shrinkage estimation and inferen...
Jointly achieving parsimony and good predictive power in high dimensions is a main challenge in stat...
Sparsity is a standard structural assumption that is made while modeling high-dimensional statistica...
<p>Tremendous progress has been made in the last two decades in the area of high-dimensional regress...
This paper reviews global-local prior distributions for Bayesian inference in high-dimensional regre...
Thesis (Ph.D.)--University of Washington, 2023Choosing a statistical model and accounting for uncert...
The horseshoe prior has proven to be a noteworthy alternative for sparse Bayesian estimation, but as...
High dimensional vector autoregressive (VAR) models require a large number of parameters to be esti...
Different challenging issues have emerged in recent years regarding the analysis of high dimensional...
We consider sparse Bayesian estimation in the classical multivariate linear regression model with p ...
Abstract from short.pdf file.Dissertation supervisors: Dr. Marco A. R. Ferreira and Dr. Tieming Ji.I...
<p>Bayesian variable selection often assumes normality, but the effects of model misspecification ar...
With advancements in genomic technologies, it is common to have two high-dimensional datasets, each ...
The horseshoe prior has proven to be a noteworthy alternative for sparse Bayesian estimation, but ha...
In this paper, we considered a Bayesian hierarchical method using the hyper product inverse moment p...
Abstract: We propose a generalized double Pareto prior for Bayesian shrinkage estimation and inferen...