RANK TESTS OF PARTIAL CORRELATION

Bulletin of Mathematical Statistics Pub Date : 1981-03-01 DOI:10.5109/13144

S. Shirahata

引用次数: 5

Abstract

Rank statistics to test the null hypothesis that X and Y are conditionally, given Z, independent are given and their asymptotic properties are investigated under the model (X, Y, Z) = (U+ anW, V-FbnW,W) where (U, V) and W are independent. It is shown that linear rank tests given by (X, Y) based on the random sample of size n are asymptotically distribution-free when (an,bn)=n-'12(a,b). It is also shown that Spearman's coefficient of rank correlation and Kendall's coefficient of rank correlation given by (X—czZ, Y—oZ) are asymptotically distribution-free when (an,bn)=(a,b) where (a,b)is some consistent estimator of (a,b).

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偏相关的秩检验

在(X, Y, Z) = (U+ anW, V- fbnw,W)其中(U, V)和W独立的模型下，给出检验X和Y有条件独立的秩统计量，并研究了它们的渐近性质。证明了当(an,bn)=n- 12(a,b)时，基于大小为n的随机样本(X, Y)给出的线性秩检验是渐近无分布的。还证明了(X-czZ, Y-oZ)给出的Spearman秩相关系数和Kendall秩相关系数在(an,bn)=(a,b)时是渐近无分布的，其中(a,b)是(a,b)的一致估计量。

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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Bulletin of Mathematical Statistics

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