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LIMIT OF THE SMALLEST EIGENVALUE OF A LARGE DIMENSIONAL SAMPLE COVARIANCE-MATRIX

被引:333
作者
BAI, ZD [1 ]
YIN, YQ [1 ]
机构
[1] UNIV MASSACHUSETTS,DEPT MATH,LOWELL,MA 01854
来源
ANNALS OF PROBABILITY | 1993年 / 21卷 / 03期
关键词
RANDOM MATRIX; SAMPLE COVARIANCE MATRIX; SMALLEST EIGENVALUE OF A RANDOM MATRIX; SPECTRAL RADIUS;
D O I
10.1214/aop/1176989118
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
In this paper, the authors show that the smallest (if p less-than-or-equal-to n) or the (p - n + 1)-th smallest (if p > n) eigenvalue of a sample covariance matrix of the form (1/n)XX' tends almost surely to the limit (1 - square-root y)2 as n and p/n --> y is-an-element-of (0, infinity), where X is a p x n matrix with iid entries with mean zero, variance 1 and fourth moment finite. Also, as a by-product, it is shown that the almost sure limit of the largest eigenvalue is (1 + square-root y)2, a known result obtained by Yin, Bai and Krishnaiah. The present approach gives a unified treatment for both the extreme eigenvalues of large sample covariance matrices.
引用
收藏
页码:1275 / 1294
页数:20
相关论文
共 12 条
[1]   A NOTE ON THE LARGEST EIGENVALUE OF A LARGE DIMENSIONAL SAMPLE COVARIANCE-MATRIX [J].
BAI, ZD ;
SILVERSTEIN, JW ;
YIN, YQ .
JOURNAL OF MULTIVARIATE ANALYSIS, 1988, 26 (02) :166-168
[2]   A LIMIT-THEOREM FOR THE NORM OF RANDOM MATRICES [J].
GEMAN, S .
ANNALS OF PROBABILITY, 1980, 8 (02) :252-261
[3]   ASYMPTOTICS OF THE DISTRIBUTION OF THE SPECTRUM OF RANDOM MATRICES [J].
GIRKO, VL .
RUSSIAN MATHEMATICAL SURVEYS, 1989, 44 (04) :3-36
[4]   SPECTRAL ANALYSIS OF NETWORKS WITH RANDOM TOPOLOGIES [J].
GRENANDER, U ;
SILVERSTEIN, JW .
SIAM JOURNAL ON APPLIED MATHEMATICS, 1977, 32 (02) :499-519
[5]  
HORN R. A., 1991, TOPICS MATRIX ANAL
[6]  
JONSSON D, 1991, J MULTIVARIATE ANAL, V12, P1
[7]  
Marcus M., 1992, SURVEY MATRIX THEORY
[8]   ON THE WEAK LIMIT OF THE LARGEST EIGENVALUE OF A LARGE DIMENSIONAL SAMPLE COVARIANCE-MATRIX [J].
SILVERSTEIN, JW .
JOURNAL OF MULTIVARIATE ANALYSIS, 1989, 30 (02) :307-311
[9]  
Von Neumann J., 1937, TOMSK U REV, V1, P286
[10]   STRONG LIMITS OF RANDOM MATRIX SPECTRA FOR SAMPLE MATRICES OF INDEPENDENT ELEMENTS [J].
WACHTER, KW .
ANNALS OF PROBABILITY, 1978, 6 (01) :1-18
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