回归函数在一点上的自适应测试

ERN: Hypothesis Testing (Topic) Pub Date : 2014-08-15 DOI:10.1214/15-AOS1342

Timothy B. Armstrong

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引用次数: 21

摘要

考虑了当整个回归函数满足null下的符号或形状限制时，在某一点上的推理问题。我们提出了一个测试，该测试自适应地在一系列Holder类上达到最优极小率，直到log log n项，我们证明了这是自适应所必需的。我们将结果应用于单调性约束下的回归不连续参数、单调回归函数在边界处的值以及多重检验问题中真零假设比例的自适应单侧检验。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Adaptive Testing on a Regression Function at a Point

We consider the problem of inference on a regression function at a point when the entire function satisfies a sign or shape restriction under the null. We propose a test that achieves the optimal minimax rate adaptively over a range of Holder classes, up to a log log n term, which we show to be necessary for adaptation. We apply the results to adaptive one-sided tests for the regression discontinuity parameter under a monotonicity restriction, the value of a monotone regression function at the boundary, and the proportion of true null hypotheses in a multiple testing problem.

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ERN: Hypothesis Testing (Topic)

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