We consider linear spectral statistics built from the block-normalized correlation matrix of a set of M mutually independent scalar time series. This matrix is composed of M2 blocks. Each block has size L × L and contains the sample cross-correlation measured at L consecutive time lags between each pair of time series. Let N denote the total number of consecutively observed windows that are used to estimate these correlation matrices. We analyze the asymptotic regime where M,L,N ? +8 while ML/N ? c*, 0 < c* < 8. We study the behavior of linear statistics of the eigenvalues of this block correlation matrix under these asymptotic conditions and show that the empirical eigenvalue distribution converges to a Marcenko-Pastur distribution. Our re...
This article is concerned with the spectral behavior of $p$-dimensional linear processes in...
International audienceConsider the empirical autocovariance matrix at a given non-zero time lag base...
Recently, the smoothed correlation between the density of eigenvalues of Hermitian random matrices w...
We consider linear spectral statistics built from the block-normalized correlation matrix of a set o...
We derive the exact form of the eigenvalue spectra of correlation matrices derived from a set of tim...
Random matrix serves as one of the key tools in understanding the eigen-structure of large dimension...
URL: http://www-spht.cea.fr/articles/t98/001/The universality of correlation functions of eigenvalue...
Testing the independence of the entries of multidimensional Gaussian observations is a very importan...
The study of correlated time series is ubiquitous in statistical analysis, and the matrix decomposit...
In this paper, we address the problem of detection, in the frequency domain, of a M-dimensional time...
The probabilistic properties of eigenvalues of random matrices whose dimension increases indefinitel...
In this paper, we address the problem of detection, in the frequency domain, of a M-dimensional time...
The study of correlated time-series is ubiquitous in statistical analysis, and the matrix decomposit...
Correlation tests of multiple Gaussian signals are typically formulated as linear spectral statistic...
Moving beyond the Wigner matrix paradigm, there is a vast literature on "band matrices" -- random ma...
This article is concerned with the spectral behavior of $p$-dimensional linear processes in...
International audienceConsider the empirical autocovariance matrix at a given non-zero time lag base...
Recently, the smoothed correlation between the density of eigenvalues of Hermitian random matrices w...
We consider linear spectral statistics built from the block-normalized correlation matrix of a set o...
We derive the exact form of the eigenvalue spectra of correlation matrices derived from a set of tim...
Random matrix serves as one of the key tools in understanding the eigen-structure of large dimension...
URL: http://www-spht.cea.fr/articles/t98/001/The universality of correlation functions of eigenvalue...
Testing the independence of the entries of multidimensional Gaussian observations is a very importan...
The study of correlated time series is ubiquitous in statistical analysis, and the matrix decomposit...
In this paper, we address the problem of detection, in the frequency domain, of a M-dimensional time...
The probabilistic properties of eigenvalues of random matrices whose dimension increases indefinitel...
In this paper, we address the problem of detection, in the frequency domain, of a M-dimensional time...
The study of correlated time-series is ubiquitous in statistical analysis, and the matrix decomposit...
Correlation tests of multiple Gaussian signals are typically formulated as linear spectral statistic...
Moving beyond the Wigner matrix paradigm, there is a vast literature on "band matrices" -- random ma...
This article is concerned with the spectral behavior of $p$-dimensional linear processes in...
International audienceConsider the empirical autocovariance matrix at a given non-zero time lag base...
Recently, the smoothed correlation between the density of eigenvalues of Hermitian random matrices w...