We propose a thresholding least-squares method of inference for high-dimensional regression models when the number of parameters, $p$, tends to infinity with the sample size, $n$. Extending the asymptotic behavior of the F-test in high dimensions, we establish the oracle property of the thresholding least-squares estimator when $p=o(n)$. We propose two automatic selection procedures for the thresholding parameter using Scheffé and Bonferroni methods. We show that, under additional regularity conditions, the results continue to hold even if $p=exp(o(n))$. Lastly, we show that, if properly centered, the residual-bootstrap estimator of the distribution of thresholding least-squares estimator is consistent, while a naive bootstrap estimator is inconsistent. In an intensive simulation study, we assess the finite sample properties of the proposed methods for various sample sizes and model parameters. The analysis of a real world data set illustrates an application of the methods in practice.
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机译:当参数数量$ p $趋于与样本大小$ n $趋于无穷大时,我们为高维回归模型提出了一种阈值最小二乘推理方法。扩展高维F检验的渐近行为,当$ p = o(n)$时,我们建立阈值最小二乘估计量的oracle属性。我们使用Scheffé和Bonferroni方法为阈值参数提出了两种自动选择程序。我们显示,在其他规则性条件下,即使$ p = exp(o(n))$,结果也继续保持不变。最后,我们证明,如果正确居中,则阈值最小二乘估计量分布的残差自举估计量是一致的,而朴素的自举估计量是不一致的。在深入的模拟研究中,我们针对各种样本量和模型参数评估了所提出方法的有限样本属性。对现实世界数据集的分析说明了该方法在实践中的应用。
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