%0 Generic %1 zhang2016simultaneous %A Zhang, Xianyang %A Cheng, Guang %D 2016 %K multivariate statistics %T Simultaneous Inference for High-dimensional Linear Models %U http://arxiv.org/abs/1603.01295 %X This paper proposes a bootstrap-assisted procedure to conduct simultaneous inference for high dimensional sparse linear models based on the recent de-sparsifying Lasso estimator (van de Geer et al. 2014). Our procedure allows the dimension of the parameter vector of interest to be exponentially larger than sample size, and it automatically accounts for the dependence within the de-sparsifying Lasso estimator. Moreover, our simultaneous testing method can be naturally coupled with the margin screening (Fan and Lv 2008) to enhance its power in sparse testing with a reduced computational cost, or with the step-down method (Romano and Wolf 2005) to provide a strong control for the family-wise error rate. In theory, we prove that our simultaneous testing procedure asymptotically achieves the pre-specified significance level, and enjoys certain optimality in terms of its power even when the model errors are non-Gaussian. Our general theory is also useful in studying the support recovery problem. To broaden the applicability, we further extend our main results to generalized linear models with convex loss functions. The effectiveness of our methods is demonstrated via simulation studies.

@misc{zhang2016simultaneous, abstract = {This paper proposes a bootstrap-assisted procedure to conduct simultaneous inference for high dimensional sparse linear models based on the recent de-sparsifying Lasso estimator (van de Geer et al. 2014). Our procedure allows the dimension of the parameter vector of interest to be exponentially larger than sample size, and it automatically accounts for the dependence within the de-sparsifying Lasso estimator. Moreover, our simultaneous testing method can be naturally coupled with the margin screening (Fan and Lv 2008) to enhance its power in sparse testing with a reduced computational cost, or with the step-down method (Romano and Wolf 2005) to provide a strong control for the family-wise error rate. In theory, we prove that our simultaneous testing procedure asymptotically achieves the pre-specified significance level, and enjoys certain optimality in terms of its power even when the model errors are non-Gaussian. Our general theory is also useful in studying the support recovery problem. To broaden the applicability, we further extend our main results to generalized linear models with convex loss functions. The effectiveness of our methods is demonstrated via simulation studies.}, added-at = {2016-03-08T22:39:19.000+0100}, author = {Zhang, Xianyang and Cheng, Guang}, biburl = {https://www.bibsonomy.org/bibtex/2040423c2775455ec02063ce2b977c053/shabbychef}, description = {Simultaneous Inference for High-dimensional Linear Models}, interhash = {7e070d5eaf93bde47fd2ddbd1f009b82}, intrahash = {040423c2775455ec02063ce2b977c053}, keywords = {multivariate statistics}, note = {cite arxiv:1603.01295Comment: To appear in JASA -- T&M. First submission date: Oct, 2014}, timestamp = {2016-03-08T22:39:19.000+0100}, title = {Simultaneous Inference for High-dimensional Linear Models}, url = {http://arxiv.org/abs/1603.01295}, year = 2016 }