A Saddlepoint Approximation to the Limiting Distribution of a k -sample Baumgartner Statistic

Journal of the Japan Statistical Society. Japanese issue Pub Date : 2009-12-01 DOI:10.14490/JJSS.39.133

H. Murakami, T. Kamakura, Midori Taniguchi

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引用次数: 6

Abstract

Testing hypothesis is one of the most important problems in a nonparametric statistic. Various nonparametric test statistics have been proposed and discussed for a long time. We use the exact critical value for testing hypothesis when the sample sizes are small. However, for large sample sizes, it is very difficult to evaluate the exact critical value. Therefore, the limiting distributions of nonparametric tests are needed for testing the hypothesis. The purpose of this paper is to derive the limiting distribution of a k-sample Baumgartner test proposed by Murakami (2006). At first we consider a two-sample problem, which is one of the most common types of statistical problems. Let X = (X1, . . . , Xn) and Y = (Y1, . . . , Ym) be two random samples of size n and m independent observations, each of which has a continuous distribution described as F (x) and G(y), respectively. Let R1 < · · · < Rn and H1 < · · · < Hm denote the combined-samples ranks of the X-value and Y -value in increasing order of magnitude, respectively. One of the problems is to test the hypothesis H0 : F = G against H1 : not H0. Baumgartner et al. (1998) defined a novel nonparametric two-sample statistic for the hypothesis as

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k样本Baumgartner统计量极限分布的鞍点逼近

检验假设是非参数统计中的一个重要问题。各种非参数检验统计量已经被提出和讨论了很长时间。当样本量较小时，我们使用精确的临界值来检验假设。然而，对于大样本量，很难评估准确的临界值。因此，非参数检验的极限分布是检验假设所必需的。本文的目的是推导村上(2006)提出的k-样本Baumgartner检验的极限分布。首先，我们考虑一个双样本问题，这是最常见的统计问题之一。设X = (X1，…)， Xn)和Y = (Y1，…)， Ym)是两个大小为n和m个独立观测值的随机样本，每个样本分别具有描述为F (x)和G(y)的连续分布。令R1 <···< Rn, H1 <···< Hm分别表示x值和Y值的组合样本的递增数量级。其中一个问题是检验假设H0: F = G对H1:而不是H0。鲍姆加特纳等人(1998)为假设定义了一种新的非参数双样本统计量为

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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Journal of the Japan Statistical Society. Japanese issue

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