Two-Sample Tests for High Dimensional Means with Thresholding and Data Transformation∗
نویسندگان
چکیده
We consider testing for two-sample means of high dimensional populations by thresholding. Two tests are investigated, which are designed for better power performance when the two population mean vectors differ only in sparsely populated coordinates. The first test is constructed by carrying out thresholding to remove the non-signal bearing dimensions. The second test combines data transformation via the precision matrix with the thresholding. The benefits of the thresholding and the data transformations are showed by a reduced variance of the test thresholding statistics, the improved power and a wider detection region of the tests. Simulation experiments and an empirical study are performed to confirm the theoretical findings and to demonstrate the practical implementations.
منابع مشابه
Supplemental Material: Two-Sample Tests for High Dimensional Means with Thresholding and Data Transformation
The supplement provides the proofs of Lemmas 1-8 and Theorems 1-3, which are omitted in the original paper. More simulation studies based on Gamma distribution are demonstrated to compare the powers of six tests. 1. PROOFS OF LEMMAS 1-8 Lemma 1. We denote δk = μ1k − μ2k. As x = o(n 1 3 ), P(nTnk + 1 > x) = {1 + o(1)}I( √ n|δk| > √ x) + [ Φ̄( √ x− √ n|δk|) + Φ̄( √ x+ √ n|δk|) ] {1 +O(n−1/6) +O( 3/...
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تاریخ انتشار 2014