Let {Xij}, i, j = · · · , be a double array of independent and identically distributed (i.i.d.) real random variables with EX11= μ, E|X11 − μ|2 = 1 and E|X11|4 < ∞. Consider sample covariance matrices (with/without empirical centering) S = 1/n nΣj=1 (sj− s)(sj −¯s)T and S = 1/n nΣj=1 sjsTj, where ¯s =1/n nΣj=1 sj and sj = T1/2 n (X1j , · · · ,Xpj)T with (T1/2 n )2 = Tn, non-random symmetric non-negative definite matrix. It is proved that central limit theorems of eigenvalue statistics of S and S are different as n → ∞ with p/n approaching a positive constant. Moreover, it is also proved that such a different behavior is not observed in the average behavior of eigenvectors.Accepted versio
Let Xp = (s1, . . . , sn) = (Xij )p×n where Xij ’s are independent and identically distributed (i.i....
Let {vij; i, J = 1, 2, ...} be a family of i.i.d. random variables with E(v114) = [infinity]. For po...
AbstractLet {vij} i,j = 1, 2,…, be i.i.d. standardized random variables. For each n, let Vn = (vij) ...
Large deviations of the largest and smallest eigenvalues of XX⊤/n are studied in thisnote, where Xp×...
<p>(A) Eigenvalue distribution of an example population covariance matrix () computed from the van ...
This paper deals with the problem of estimating the covariance matrix of a series of independent mul...
During the last twenty years, Random matrix theory (RMT) has produced numerous results that allow a ...
Abstract. Sample covariance matrix and multivariate F-matrix play important roles in multivariate st...
AbstractLet {vij}, i, j = 1,2, …, be i.i.d. random variables, and for each n let Mn = (1s)VnVnT, whe...
Abstract : The equality of covariance matrices is an essential assumption in means and discriminant...
This article studies the limiting behavior of a class of robust population covariance matrix estimat...
In this paper, tests are developed for testing certain hypotheses on the covari-ance matrix Σ, when ...
AbstractFor normally distributed data from the k populations with m×m covariance matrices Σ1,…,Σk, w...
The salient properties of large empirical covariance and correlation matrices are studied for three ...
Let Xn be n×N containing i.i.d. complex entries and unit variance (sum of variances of real and imag...
Let Xp = (s1, . . . , sn) = (Xij )p×n where Xij ’s are independent and identically distributed (i.i....
Let {vij; i, J = 1, 2, ...} be a family of i.i.d. random variables with E(v114) = [infinity]. For po...
AbstractLet {vij} i,j = 1, 2,…, be i.i.d. standardized random variables. For each n, let Vn = (vij) ...
Large deviations of the largest and smallest eigenvalues of XX⊤/n are studied in thisnote, where Xp×...
<p>(A) Eigenvalue distribution of an example population covariance matrix () computed from the van ...
This paper deals with the problem of estimating the covariance matrix of a series of independent mul...
During the last twenty years, Random matrix theory (RMT) has produced numerous results that allow a ...
Abstract. Sample covariance matrix and multivariate F-matrix play important roles in multivariate st...
AbstractLet {vij}, i, j = 1,2, …, be i.i.d. random variables, and for each n let Mn = (1s)VnVnT, whe...
Abstract : The equality of covariance matrices is an essential assumption in means and discriminant...
This article studies the limiting behavior of a class of robust population covariance matrix estimat...
In this paper, tests are developed for testing certain hypotheses on the covari-ance matrix Σ, when ...
AbstractFor normally distributed data from the k populations with m×m covariance matrices Σ1,…,Σk, w...
The salient properties of large empirical covariance and correlation matrices are studied for three ...
Let Xn be n×N containing i.i.d. complex entries and unit variance (sum of variances of real and imag...
Let Xp = (s1, . . . , sn) = (Xij )p×n where Xij ’s are independent and identically distributed (i.i....
Let {vij; i, J = 1, 2, ...} be a family of i.i.d. random variables with E(v114) = [infinity]. For po...
AbstractLet {vij} i,j = 1, 2,…, be i.i.d. standardized random variables. For each n, let Vn = (vij) ...