Consider a random vector $\mathbf{y}=\mathbf{\Sigma}^{1/2}\mathbf{x}$, where the $p$ elements of the vector $\mathbf{x}$ are i.i.d. real-valued random variables with zero mean and finite fourth moment, and $\mathbf{\Sigma}^{1/2}$ is a deterministic $p\times p$ matrix such that the spectral norm of the population correlation matrix $\mathbf{R}$ of $\mathbf{y}$ is uniformly bounded. In this paper, we find that the log determinant of the sample correlation matrix $\hat{\mathbf{R}}$ based on a sample of size $n$ from the distribution of $\mathbf{y}$ satisfies a CLT (central limit theorem) for $p/n\to \gamma\in (0, 1]$ and $p\leq n$. Explicit formulas for the asymptotic mean and variance are provided. In case the mean of $\mathbf{y}$ is unknown,...
Let A = 1/√np(XT X−pIn) where X is a p×n matrix, consisting of independent and identically distribut...
51 pages ; it replaces and extends arXiv:math/0607767 and arxiv:math.PR/050921 Third version: correc...
We consider n × n real symmetric and hermitian random matrices Hn,m equals the sum of a non-random m...
In this paper, we show the central limit theorem for the logarithmic determinant of the sample corre...
Let Q = (Q1, . . . ,Qn) be a random vector drawn from the uniform distribution on the set of all n! ...
Abstract. Let Q = (Q1,..., Qn) be a random vector drawn from the uni-form distribution on the set of...
Abstract. Let An be an n by n random matrix whose entries are independent real random variables saty...
Testing the independence of the entries of multidimensional Gaussian observations is a very importan...
Consider the square random matrix An = (aij)n,n, where {aij:= a(n)ij , i, j = 1, . . . , n} is a col...
In this paper, we study the empirical spectral distribution of Spearman's rank correlation matrices,...
In this paper, we establish the central limit theorem (CLT) for linear spectral statistics (LSS) of ...
Consider two random vectors $\widetilde{\mathbf x} \in \mathbb R^p$ and $\widetilde{\mathbf y} \in \...
Random matrix serves as one of the key tools in understanding the eigen-structure of large dimension...
International audienceWe consider n × n real symmetric and hermitian random matrices Hn,m equals the...
We prove that Kendall’s Rank correlation matrix converges to the Marčenko Pastur law, under the assu...
Let A = 1/√np(XT X−pIn) where X is a p×n matrix, consisting of independent and identically distribut...
51 pages ; it replaces and extends arXiv:math/0607767 and arxiv:math.PR/050921 Third version: correc...
We consider n × n real symmetric and hermitian random matrices Hn,m equals the sum of a non-random m...
In this paper, we show the central limit theorem for the logarithmic determinant of the sample corre...
Let Q = (Q1, . . . ,Qn) be a random vector drawn from the uniform distribution on the set of all n! ...
Abstract. Let Q = (Q1,..., Qn) be a random vector drawn from the uni-form distribution on the set of...
Abstract. Let An be an n by n random matrix whose entries are independent real random variables saty...
Testing the independence of the entries of multidimensional Gaussian observations is a very importan...
Consider the square random matrix An = (aij)n,n, where {aij:= a(n)ij , i, j = 1, . . . , n} is a col...
In this paper, we study the empirical spectral distribution of Spearman's rank correlation matrices,...
In this paper, we establish the central limit theorem (CLT) for linear spectral statistics (LSS) of ...
Consider two random vectors $\widetilde{\mathbf x} \in \mathbb R^p$ and $\widetilde{\mathbf y} \in \...
Random matrix serves as one of the key tools in understanding the eigen-structure of large dimension...
International audienceWe consider n × n real symmetric and hermitian random matrices Hn,m equals the...
We prove that Kendall’s Rank correlation matrix converges to the Marčenko Pastur law, under the assu...
Let A = 1/√np(XT X−pIn) where X is a p×n matrix, consisting of independent and identically distribut...
51 pages ; it replaces and extends arXiv:math/0607767 and arxiv:math.PR/050921 Third version: correc...
We consider n × n real symmetric and hermitian random matrices Hn,m equals the sum of a non-random m...