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題名 關於某些無母數檢定統計量的漸近常態性之研究
其他題名 On the Asymptotic Normality of Certain Nonparametric Test Statistics
作者 劉明路
Liu, Ming-Ru
貢獻者 統計學系
日期 1981-05
上傳時間 30-Sep-2016 10:29:29 (UTC+8)
摘要 假定(X11,X21),…,(X1m,X2m)及(Y11,Y21),…,(Y1n,Y2n)是分別從具有連續分配函數Fx1,x2(x1,x2)及GY1,Y2 (y1,y2)之母體抽取出來的兩個獨立二元(bivariate)隨機樣本;我們假設這兩個母體具有相同之平均數(mean),而這平均數可以是已知,也可以是未知。我們想要測出這兩個母體之離勢(variability or dispersion)是否不同。母體是一元(univariate)於情況已有甚多的研究發表。然而像這類母體是二元的情況,至今甚少研究。在這篇論文中,提出了兩種無母數檢定W及W*,並且在連續分配Fx1,x2(x1,x2)及GY1,Y2 (y1,y2)滿足相當一般的條件下,可得出W及W*的漸近常態性。這種漸近性在研究檢定過程的有效性(efficiency)是極為有用的。
Suppose (X11,X21),..., (X1m,X2m) and (Y11,Y21), ...,(Y1n,Y2n) are two independent bivariate random samples from populations with continuous distribution functions Fx1,x2 (x1,x2) and GY1,Y2 (y1,y2) respectively. We assume that the two populations have a common mean, which is either known or unknown. We would like to detect differences, in variability or dispersion for the two populations. However, the bivariate case seems to have been studied far less fully than a univariate one. In this paper, we suggest two nonparametric tests W and W* and establish the asymptotic normality of W and W* under fairly general conditions on the underlying distribution functions Fx1,x2 (x1,x2) and GY1,Y2 (y1,y2).This asymptotic property is very useful in investigating the efficiency of the test procedures.
關聯 國立政治大學學報, 43, 65-78
資料類型 article
dc.contributor 統計學系
dc.creator (作者) 劉明路zh_TW
dc.creator (作者) Liu, Ming-Ru
dc.date (日期) 1981-05
dc.date.accessioned 30-Sep-2016 10:29:29 (UTC+8)-
dc.date.available 30-Sep-2016 10:29:29 (UTC+8)-
dc.date.issued (上傳時間) 30-Sep-2016 10:29:29 (UTC+8)-
dc.identifier.uri (URI) http://nccur.lib.nccu.edu.tw/handle/140.119/102400-
dc.description.abstract (摘要) 假定(X11,X21),…,(X1m,X2m)及(Y11,Y21),…,(Y1n,Y2n)是分別從具有連續分配函數Fx1,x2(x1,x2)及GY1,Y2 (y1,y2)之母體抽取出來的兩個獨立二元(bivariate)隨機樣本;我們假設這兩個母體具有相同之平均數(mean),而這平均數可以是已知,也可以是未知。我們想要測出這兩個母體之離勢(variability or dispersion)是否不同。母體是一元(univariate)於情況已有甚多的研究發表。然而像這類母體是二元的情況,至今甚少研究。在這篇論文中,提出了兩種無母數檢定W及W*,並且在連續分配Fx1,x2(x1,x2)及GY1,Y2 (y1,y2)滿足相當一般的條件下,可得出W及W*的漸近常態性。這種漸近性在研究檢定過程的有效性(efficiency)是極為有用的。
dc.description.abstract (摘要) Suppose (X11,X21),..., (X1m,X2m) and (Y11,Y21), ...,(Y1n,Y2n) are two independent bivariate random samples from populations with continuous distribution functions Fx1,x2 (x1,x2) and GY1,Y2 (y1,y2) respectively. We assume that the two populations have a common mean, which is either known or unknown. We would like to detect differences, in variability or dispersion for the two populations. However, the bivariate case seems to have been studied far less fully than a univariate one. In this paper, we suggest two nonparametric tests W and W* and establish the asymptotic normality of W and W* under fairly general conditions on the underlying distribution functions Fx1,x2 (x1,x2) and GY1,Y2 (y1,y2).This asymptotic property is very useful in investigating the efficiency of the test procedures.
dc.format.extent 827220 bytes-
dc.format.mimetype application/pdf-
dc.relation (關聯) 國立政治大學學報, 43, 65-78
dc.title (題名) 關於某些無母數檢定統計量的漸近常態性之研究zh_TW
dc.title.alternative (其他題名) On the Asymptotic Normality of Certain Nonparametric Test Statistics
dc.type (資料類型) article