In this paper, we are interested in the asymptotic properties for the largest eigenvalue of the Hermitian random matrix ensemble, called the Generalized Cauchy ensemble GCyE, whose eigenvalues PDF is given by $$\textrm{const}\cdot\prod_{1\leq j−1/2 and where N is the size of the matrix ensemble. Using results by Borodin and Olshanski (Commun. Math. Phys., 223(1):87-123, 2001), we first prove that for this ensemble, the law of the largest eigenvalue divided by N converges to some probability distribution for all s such that ℜ(s)>−1/2. Using results by Forrester and Witte (Nagoya Math. J., 174:29-114, 2002) on the distribution of the largest eigenvalue for fixed N, we also express the limiting probability distribution in terms of some non-lin...
none1noWe derive efficient recursive formulas giving the exact distribution of the largest eigenvalu...
18 pages, 5 figures. Typos corrected and some additional discussion added18 pages, 5 figures. Typos ...
We consider quadratic forms of deterministic matrices $A$ evaluated at the random eigenvectors of a ...
Abstract. In this paper, we are interested in the asymptotic properties for the largest eigenvalue o...
We study the rate of convergence for the largest eigenvalue distributions in the Gaussian unitary an...
Let N−−√+λmaxN+λmax be the largest real eigenvalue of a random N×NN×N matrix with independent N(0,1)...
The author considers the largest eigenvalues of random matrices from Gaussian unitary ensemble and L...
We consider random n×n matrices of the form (XX^∗+YY^∗)^(−1/2)YY^∗(XX^∗+YY^∗)^(−1/2), where X and Y...
AbstractWe generally study the density of eigenvalues in unitary ensembles of random matrices from t...
We prove that the distribution function of the largest eigenvalue in the Gaussian Unitary E...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
ABSTRACT. The study of the limiting distribution of eigenvalues of N × N random matrices as N → ∞ h...
© 2021 Allan TrinhMany limit laws arise from the spectral theory of large random matrices. Complemen...
63 pagesInternational audienceLet $\mathbf X_N= (X_1^{(N)} \etc X_p^{(N)})$ be a family of $N \times...
We consider products of random matrices that are small, independent identically distributed perturba...
none1noWe derive efficient recursive formulas giving the exact distribution of the largest eigenvalu...
18 pages, 5 figures. Typos corrected and some additional discussion added18 pages, 5 figures. Typos ...
We consider quadratic forms of deterministic matrices $A$ evaluated at the random eigenvectors of a ...
Abstract. In this paper, we are interested in the asymptotic properties for the largest eigenvalue o...
We study the rate of convergence for the largest eigenvalue distributions in the Gaussian unitary an...
Let N−−√+λmaxN+λmax be the largest real eigenvalue of a random N×NN×N matrix with independent N(0,1)...
The author considers the largest eigenvalues of random matrices from Gaussian unitary ensemble and L...
We consider random n×n matrices of the form (XX^∗+YY^∗)^(−1/2)YY^∗(XX^∗+YY^∗)^(−1/2), where X and Y...
AbstractWe generally study the density of eigenvalues in unitary ensembles of random matrices from t...
We prove that the distribution function of the largest eigenvalue in the Gaussian Unitary E...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
ABSTRACT. The study of the limiting distribution of eigenvalues of N × N random matrices as N → ∞ h...
© 2021 Allan TrinhMany limit laws arise from the spectral theory of large random matrices. Complemen...
63 pagesInternational audienceLet $\mathbf X_N= (X_1^{(N)} \etc X_p^{(N)})$ be a family of $N \times...
We consider products of random matrices that are small, independent identically distributed perturba...
none1noWe derive efficient recursive formulas giving the exact distribution of the largest eigenvalu...
18 pages, 5 figures. Typos corrected and some additional discussion added18 pages, 5 figures. Typos ...
We consider quadratic forms of deterministic matrices $A$ evaluated at the random eigenvectors of a ...