High-dimensional data are commonly seen in modern statistical applications, variable selection methods play indispensable roles in identifying the critical features for scientific discoveries. Traditional best subset selection methods are computationally intractable with a large number of features, while regularization methods such as Lasso, SCAD and their variants perform poorly in ultrahigh-dimensional data due to low computational efficiency and unstable algorithm. Sure screening methods have become popular alternatives by first rapidly reducing the dimension using simple measures such as marginal correlation then applying any regularization methods. A number of screening methods for different models or problems have been developed, howe...
In this research, we investigate the sequential lasso method for feature selection in sparse high di...
Ultrahigh-dimensional gene features are often collected in modern cancer studies in which the number...
The widely used least absolute deviation (LAD) estimator with the smoothly clipped absolute deviatio...
This article is concerned with screening features in ultrahigh-dimensional data analysis, which has ...
Variable screening is a fast dimension reduction technique for assisting high dimensional feature se...
We revisit sure independence screening procedures for variable selection in generalized linear model...
In this thesis, we propose new methodologies targeting the areas of high-dimensional variable screen...
Herein, we propose a Spearman rank correlation-based screening procedure for ultrahigh-dimensional d...
Variable selection is a challenging issue in statistical applications when the number of predictors ...
High-dimensional data, data in which the number of dimensions exceeds the number of observations, is...
High-dimensional data are widely encountered in a great variety of areas such as bioinformatics, med...
Contemporary high-throughput experimental and surveying techniques give rise to ultrahigh-dimensiona...
Variable screening and variable selection methods play important roles in modeling high dimensional ...
Variable selection plays an important role for the high dimensional data analysis. In this work, we ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/107512/1/biom12137-sm-0001-SuppData.pdf...
In this research, we investigate the sequential lasso method for feature selection in sparse high di...
Ultrahigh-dimensional gene features are often collected in modern cancer studies in which the number...
The widely used least absolute deviation (LAD) estimator with the smoothly clipped absolute deviatio...
This article is concerned with screening features in ultrahigh-dimensional data analysis, which has ...
Variable screening is a fast dimension reduction technique for assisting high dimensional feature se...
We revisit sure independence screening procedures for variable selection in generalized linear model...
In this thesis, we propose new methodologies targeting the areas of high-dimensional variable screen...
Herein, we propose a Spearman rank correlation-based screening procedure for ultrahigh-dimensional d...
Variable selection is a challenging issue in statistical applications when the number of predictors ...
High-dimensional data, data in which the number of dimensions exceeds the number of observations, is...
High-dimensional data are widely encountered in a great variety of areas such as bioinformatics, med...
Contemporary high-throughput experimental and surveying techniques give rise to ultrahigh-dimensiona...
Variable screening and variable selection methods play important roles in modeling high dimensional ...
Variable selection plays an important role for the high dimensional data analysis. In this work, we ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/107512/1/biom12137-sm-0001-SuppData.pdf...
In this research, we investigate the sequential lasso method for feature selection in sparse high di...
Ultrahigh-dimensional gene features are often collected in modern cancer studies in which the number...
The widely used least absolute deviation (LAD) estimator with the smoothly clipped absolute deviatio...