The probabilistic properties of eigenvalues of random matrices whose dimension increases indefinitely has received considerable attention. One important aspect is the existence and identification of the limiting spectral distribution (LSD) of the empirical distribution of the eigenvalues. When the LSD exists, it is useful to know the rate at which the convergence holds. The main method to establish such rates is the use of Stieltjes transform. In this article we introduce a new technique of bounding the rates of convergence to the LSD. We show how our results apply to specific cases such as the Wigner matrix and the Sample Covariance matrix
© 2021 Allan TrinhMany limit laws arise from the spectral theory of large random matrices. Complemen...
Let Bn=Sn(Sn+αnTN)−1, where Sn and TN are two independent sample covariance matrices with dimension ...
We consider ensembles of Wigner matrices, whose entries are (up to the symmetry constraints) indepen...
A new form of empirical spectral distribution of a Wigner matrix Wn with weights specified by the ei...
AbstractLet Wn be n×n Hermitian whose entries on and above the diagonal are independent complex rand...
AbstractLet X be n × N containing i.i.d. complex entries with E |X11 − EX11|2 = 1, and T an n × n ra...
International audienceThis paper studies the behaviour of the empirical eigenvalue distribution of l...
We study the asymptotic of the spectral distribution for large empirical covariance matric...
We study the asymptotics of the spectral distribution for large empirical covariance matrices compos...
AbstractWe introduce a random matrix model where the entries are dependent across both rows and colu...
AbstractThe existence of limiting spectral distribution (LSD) of the product of two random matrices ...
AbstractResults on the analytic behavior of the limiting spectral distribution of matrices of sample...
International audienceWe consider the empirical spectral distribution (ESD) of a random matrix from ...
AbstractA stronger result on the limiting distribution of the eigenvalues of random Hermitian matric...
Abstract. In this paper, we improve known results on the convergence rates of spectral distri-bution...
© 2021 Allan TrinhMany limit laws arise from the spectral theory of large random matrices. Complemen...
Let Bn=Sn(Sn+αnTN)−1, where Sn and TN are two independent sample covariance matrices with dimension ...
We consider ensembles of Wigner matrices, whose entries are (up to the symmetry constraints) indepen...
A new form of empirical spectral distribution of a Wigner matrix Wn with weights specified by the ei...
AbstractLet Wn be n×n Hermitian whose entries on and above the diagonal are independent complex rand...
AbstractLet X be n × N containing i.i.d. complex entries with E |X11 − EX11|2 = 1, and T an n × n ra...
International audienceThis paper studies the behaviour of the empirical eigenvalue distribution of l...
We study the asymptotic of the spectral distribution for large empirical covariance matric...
We study the asymptotics of the spectral distribution for large empirical covariance matrices compos...
AbstractWe introduce a random matrix model where the entries are dependent across both rows and colu...
AbstractThe existence of limiting spectral distribution (LSD) of the product of two random matrices ...
AbstractResults on the analytic behavior of the limiting spectral distribution of matrices of sample...
International audienceWe consider the empirical spectral distribution (ESD) of a random matrix from ...
AbstractA stronger result on the limiting distribution of the eigenvalues of random Hermitian matric...
Abstract. In this paper, we improve known results on the convergence rates of spectral distri-bution...
© 2021 Allan TrinhMany limit laws arise from the spectral theory of large random matrices. Complemen...
Let Bn=Sn(Sn+αnTN)−1, where Sn and TN are two independent sample covariance matrices with dimension ...
We consider ensembles of Wigner matrices, whose entries are (up to the symmetry constraints) indepen...