We study a mean-field spike and slab variational Bayes (VB) approximation to Bayesian model selection priors in sparse high-dimensional linear regression. Under compatibility conditions on the design matrix, oracle inequalities are derived for the mean-field VB approximation, implying that it converges to the sparse truth at the optimal rate and gives optimal prediction of the response vector. The empirical performance of our algorithm is studied, showing that it works comparably well as other state-of-the-art Bayesian variable selection methods. We also numerically demonstrate that the widely used coordinate-ascent variational inference algorithm can be highly sensitive to the parameter updating order, leading to potentially poor performan...
Modern methods for Bayesian regression beyond the Gaussian response setting are often computationall...
This paper presents a variational Bayesian kernel selection (VBKS) algorithm for sparse Gaussian pro...
Bayesian sparse factor analysis has many applications; for example, it has been applied to the probl...
We study a mean-field spike and slab variational Bayes (VB) approximation to Bayesian model selectio...
We develop methodology and theory for a mean field variational Bayes approximation to a linear model...
In high-dimensional regression models, the Bayesian lasso with the Gaussian spike and slab priors is...
Variational Inference (VI) has become a popular technique to approximate difficult-to-compute poster...
Variational inference (VI) or Variational Bayes (VB) is a popular alternative to MCMC, which doesn\u...
Linear mixed models are a versatile statistical tool to study data by accounting for fixed effects a...
Learning sparsity pattern in high dimension is a great challenge in both implementation and theory. ...
In this work, we propose a novel approximated collapsed variational Bayes approach to model selectio...
Abstract—Recently, a number of mostly-norm regularized least-squares-type deterministic algorithms h...
Sparsity-promoting prior along with Bayesian inference is an effective approach in solving sparse li...
Linear mixed models are a versatile statistical tool to study data by accounting for fixed effects a...
We introduce Group Spike-and-slab Variational Bayes (GSVB), a scalable method for group sparse regre...
Modern methods for Bayesian regression beyond the Gaussian response setting are often computationall...
This paper presents a variational Bayesian kernel selection (VBKS) algorithm for sparse Gaussian pro...
Bayesian sparse factor analysis has many applications; for example, it has been applied to the probl...
We study a mean-field spike and slab variational Bayes (VB) approximation to Bayesian model selectio...
We develop methodology and theory for a mean field variational Bayes approximation to a linear model...
In high-dimensional regression models, the Bayesian lasso with the Gaussian spike and slab priors is...
Variational Inference (VI) has become a popular technique to approximate difficult-to-compute poster...
Variational inference (VI) or Variational Bayes (VB) is a popular alternative to MCMC, which doesn\u...
Linear mixed models are a versatile statistical tool to study data by accounting for fixed effects a...
Learning sparsity pattern in high dimension is a great challenge in both implementation and theory. ...
In this work, we propose a novel approximated collapsed variational Bayes approach to model selectio...
Abstract—Recently, a number of mostly-norm regularized least-squares-type deterministic algorithms h...
Sparsity-promoting prior along with Bayesian inference is an effective approach in solving sparse li...
Linear mixed models are a versatile statistical tool to study data by accounting for fixed effects a...
We introduce Group Spike-and-slab Variational Bayes (GSVB), a scalable method for group sparse regre...
Modern methods for Bayesian regression beyond the Gaussian response setting are often computationall...
This paper presents a variational Bayesian kernel selection (VBKS) algorithm for sparse Gaussian pro...
Bayesian sparse factor analysis has many applications; for example, it has been applied to the probl...