论文信息 - Asymptotic distribution of the largest off-diagonal entry of correlation matrices

Asymptotic distribution of the largest off-diagonal entry of correlation matrices

Suppose that we have observations from a -dimensional population. We are interested in testing that the variates of the population are independent under the situation where goes to infinity as . A test statistic is chosen to be , where is the sample correlation coefficient between the -th coordinate and the -th coordinate of the population. Under an independent hypothesis, we prove that the asymptotic distribution of is an extreme distribution of type , by using the Chen-Stein Poisson approximation method and the moderate deviations for sample correlation coefficients. As a statistically more relevant result, a limit distribution for , where is Spearman's rank correlation coefficient between the -th coordinate and the -th coordinate of the population, is derived

Wang Zhou

[1] R. Fisher. FREQUENCY DISTRIBUTION OF THE VALUES OF THE CORRELATION COEFFIENTS IN SAMPLES FROM AN INDEFINITELY LARGE POPU;ATION , 1915 .

[2] H. Hotelling. New Light on the Correlation Coefficient and its Transforms , 1953 .

[3] P. Sen,et al. Theory of rank tests , 1969 .

[4] D. Wolfe,et al. Nonparametric Statistical Methods. , 1974 .

[5] G. K. Eagleson,et al. Poisson Convergence for Dissociated Statistics , 1984 .

[6] Cramer Type Large Deviations for Generalized Rank Statistics , 1985 .

[7] L. Gordon,et al. Two moments su ce for Poisson approx-imations: the Chen-Stein method , 1989 .

[8] Q. Shao. Self-normalized large deviations , 1997 .

[9] Qi-Man Shao,et al. A Cramér Type Large Deviation Result for Student's t-Statistic , 1999 .

[10] Bing-Yi Jing,et al. An Exponential Nonuniform Berry-Esseen Bound for Self-Normalized Sums , 1999 .

[11] Jaroslav Hájek,et al. Theory of rank tests , 1969 .

[12] Philip H. Ramsey. Nonparametric Statistical Methods , 1974, Technometrics.

[13] I. Johnstone. On the distribution of the largest eigenvalue in principal components analysis , 2001 .

[14] Bing-Yi Jing,et al. Self-normalized Cramér-type large deviations for independent random variables , 2003 .

[15] Tiefeng Jiang,et al. The asymptotic distributions of the largest entries of sample correlation matrices , 2004, math/0406184.