首页 | 本学科首页   官方微博 | 高级检索  
     检索      

单总体方差检验中一致最大势检验(UMPUT)临界值的研究
引用本文:张莉娜,濮晓龙.单总体方差检验中一致最大势检验(UMPUT)临界值的研究[J].浙江大学学报(理学版),2009,36(4):376-380.
作者姓名:张莉娜  濮晓龙
作者单位:1. 上海交通大学 医学院 生物统计学教研室,上海,200025
2. 华东师范大学 统计系,上海,200062
摘    要:方差检验问题在实际生活中应用广泛,对于同一假设可能有不同的检验方法,这就涉及到检验方法的优劣性问题,本文就正态总体对单总体方差检验作了一些研究.对单总体问题,考虑H0:σ^2=σ0^2vsH1:σ^2≠σ0^2,通常采用的χ^2检验并不是无偏的,给出了无偏检验的临界值.将该无偏检验与常用的χ^2检验就势函数进行比较,指出当样本量n不大时二者是有差别的.

关 键 词:无偏检验  一致最大势检验(UMPUT)  势函数  随机模拟

Critical values of unbiased test on significance tests in variance of one sample normal distribution
ZHANG Li-na,PU Xiao-long.Critical values of unbiased test on significance tests in variance of one sample normal distribution[J].Journal of Zhejiang University(Sciences Edition),2009,36(4):376-380.
Authors:ZHANG Li-na  PU Xiao-long
Institution:1. Department of Biostatistics;School of Medicine;Shanghai Jiaotong University;Shanghai 200025;China;2. Department of Statistics;East China Normal University;Shanghai 200062;China
Abstract:Due to its wide application in different fields, considerable attention has been given to the problem about hypothesis tests on variance of the normal distribution. There are different test methods under the same null and alternative hypothesis. But which is better? Some analysis on this aspect is made. Significance tests in variance of one sample normal distribution is considered. For testing H0: σ^2 =σ0^2 vs H1 : σ^2 ≠σ0^2 ,χ^2-test is usually used. But it's not unbiased. It is proved that among the given-formed tests, the unbiased test is unique and its critical values were calculated. Monte Carlo simulation studies were carried out to calculate power function of χ^2-test and unbiased test. An empirical power function comparison of the above tests suggested that there are differences between the two tests when the sample n is not large.
Keywords:unbiased test  uniformly most powerful unbiased test(UMPUT)  power function  simulation of randon
本文献已被 CNKI 维普 万方数据 等数据库收录!
点击此处可从《浙江大学学报(理学版)》浏览原始摘要信息
点击此处可从《浙江大学学报(理学版)》下载免费的PDF全文
设为首页 | 免责声明 | 关于勤云 | 加入收藏

Copyright©北京勤云科技发展有限公司  京ICP备09084417号