In this article, we develop a new estimation and valid inference method for single or low-dimensional regression coefficients in high-dimensional generalized linear models. The number of the predictors is allowed to grow exponentially fast with respect to the sample size. The proposed estimator is computed by solving a score function. We recursively conduct model selection to reduce the dimensionality from high to a moderate scale and construct the score equation based on the selected variables. The proposed confidence interval (CI) achieves valid coverage without assuming consistency of the model selection procedure. When the selection consistency is achieved, we show the length of the proposed CI is asymptotically the same as the CI of th...
Constructing confidence intervals in high-dimensional models is a challenging task due to the lack o...
We provide theoretical justification for post-selection inference in high-dimensional Cox models, ba...
Abstract. We present a (selective) review of recent frequentist high-dimensional inference methods f...
In this article, we develop a new estimation and valid inference method for single or low-dimensiona...
We study partially linear single-index models where both model parts may contain high-dimensional va...
High-dimensional linear models play an important role in the analysis of modern data sets. Although ...
High-dimensional linear models play an important role in the analysis of modern data sets. Although ...
This paper considers the estimation and inference of the low-rank components in high-dimensional mat...
This dissertation considers the problem of estimation and inference in four high-dimensional models:...
Recent advances in science and technology have provided researchers with unprecedented amounts of da...
Thesis (Ph.D.)--University of Washington, 2017-12This thesis tackles three different problems in hig...
This paper presents a selective survey of recent developments in statistical inference and multiple ...
Thesis (Master's)--University of Washington, 2017This thesis concerns statistical inference for the ...
Quantifying the uncertainty of estimated parameters in high dimensional sparse models gives critical...
In high-dimensional regression problems, a key aim is to identify a sparse model that fits the data...
Constructing confidence intervals in high-dimensional models is a challenging task due to the lack o...
We provide theoretical justification for post-selection inference in high-dimensional Cox models, ba...
Abstract. We present a (selective) review of recent frequentist high-dimensional inference methods f...
In this article, we develop a new estimation and valid inference method for single or low-dimensiona...
We study partially linear single-index models where both model parts may contain high-dimensional va...
High-dimensional linear models play an important role in the analysis of modern data sets. Although ...
High-dimensional linear models play an important role in the analysis of modern data sets. Although ...
This paper considers the estimation and inference of the low-rank components in high-dimensional mat...
This dissertation considers the problem of estimation and inference in four high-dimensional models:...
Recent advances in science and technology have provided researchers with unprecedented amounts of da...
Thesis (Ph.D.)--University of Washington, 2017-12This thesis tackles three different problems in hig...
This paper presents a selective survey of recent developments in statistical inference and multiple ...
Thesis (Master's)--University of Washington, 2017This thesis concerns statistical inference for the ...
Quantifying the uncertainty of estimated parameters in high dimensional sparse models gives critical...
In high-dimensional regression problems, a key aim is to identify a sparse model that fits the data...
Constructing confidence intervals in high-dimensional models is a challenging task due to the lack o...
We provide theoretical justification for post-selection inference in high-dimensional Cox models, ba...
Abstract. We present a (selective) review of recent frequentist high-dimensional inference methods f...