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基于小波阈值和奈曼截断的显著性检验

Test of Significance Based on Wavelet Thresholding and Neyman's Truncation

Journal of the American Statistical Association · 1996
被引 79
ABS 4

中文导读

提出两种基于小波阈值和奈曼截断的检验统计量,相比传统检验在检测尖锐峰值和高频交替时具有更高功效,同时保持对平滑备择密度的检测能力。

Abstract

Abstract Traditional nonparametric tests, such as the Kolmogorov—Smirnov test and the Cramér—Von Mises test, are based on the empirical distribution functions. Although these tests possess root-n consistency, they effectively use only information contained in the low frequencies. This leads to low power in detecting fine features such as sharp and short aberrants as well as global features such as high-frequency alternations. The drawback can be repaired via smoothing-based test statistics. In this article we propose two such kind of test statistics based on the wavelet thresholding and the Neyman truncation. We provide extensive evidence to demonstrate that the proposed tests have higher power in detecting sharp peaks and high frequency alternations, while maintaining the same capability in detecting smooth alternative densities as the traditional tests. Similar conclusions can be made for two-sample nonparametric tests of distribution functions. In that case, the traditional linear rank tests such as the Wilcoxon test and the Fisher—Yates test have low power in detecting two nearby densities where one has local features or contains high-frequency components, because these procedures are essentially testing the uniform distribution based on the sample mean of rank statistics. In contrast, the proposed tests use more fully the sampling information and have better ability in detecting subtle features. Key Words: Adaptive Neyman testGoodness-of-fitHard-thresholding parameterSoft-thresholding parameterTwo-sample testWavelet thresholding

非参数检验小波分析统计检验假设检验