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一些非参数距离检验的Bootstrap复兴

A Bootstrap Revival of Some Nonparametric Distance Tests

Journal of the American Statistical Association · 1988
被引 27
ABS 4

中文导读

本文提出用Bootstrap方法确定基于经验测度的非参数距离检验的临界值,在极弱假设下(数据可离散、连续或分类)保证渐近正确水平,并通过模拟验证中等样本量下的有效性。

Abstract

Abstract Several tests based on the empirical measure have been proposed to test independence of variables, goodness of fit, equality of distributions, rotational invariance, and so forth. These tests have excellent power properties, but critical values are difficult, if not impossible, to obtain. Furthermore, these tests usually assume that the data are real-valued with continuous distributions. Here, critical values are determined by bootstrapping and the resulting tests are shown to have the correct asymptotic level under minimal assumptions. For example, given data Xi = (X i,1, …, Xi,d ), i = 1, …, n, it may be desired to test independence of the d components. The proposed test compares the empirical measure and the product of its marginals by taking a supremum over an appropriate Vapnik-Cervonenkis class of sets. No assumptions are made on the probability distribution of the data or on the space in which it lives; indeed, some components may be discrete, some continuous, and others categorical. Similar results are obtained for other examples. Consistency of the tests is obtained against all alternatives. A modest simulation study shows that the bootstrap works satisfactorily for moderate sample sizes. Key Words: Distance testsGoodness of fitNonparametric testsTesting equality of distributionsTesting for rotational invarianceTesting independenceVapnik-Cervonenkis classes

非参数统计假设检验Bootstrap方法独立性检验拟合优度检验