Add to ORKGLetAbe annbynmatrix whose elements are independent random variables with standard normal distributions. Girko's (more general) circular law states that the distribution of appropriately normalized eigenvalues is asymptotically uniform in the unit disk in the complex plane. We derive the exact expected empirical spectral distribution of the complex eigenvalues for finiten, from which convergence in the expected distribution to the circular law for normally distributed matrices may be derived. Similar methodology allows us to derive a joint distribution formula for the real Schur decomposition ofA. Integration of this distribution yields the probability thatAhas exactlykreal eigenvalues. For example, we show that the probability thatAhas all ...
AbstractConsider the empirical spectral distribution of complex random n×n matrix whose entries are ...
accepted in Journal of Theoretical ProbabilityInternational audienceLet $(X_{jk})_{j,k\geq 1}$ be an...
size n ? 50, you will see for yourself that a random matrix has structure. Experiments with the unif...
AbstractLetAbe annbynmatrix whose elements are independent random variables with standard normal dis...
Let A be an n by n matrix whose elements are independent random variables with standard normal distr...
AbstractLetAbe annbynmatrix whose elements are independent random variables with standard normal dis...
Abstract. Let Mn be a random matrix of size n×n and let λ1,..., λn be the eigenvalues of Mn. The emp...
Given an n x n complex matrix A, let mu(A)(x, y) := 1/n vertical bar{1 <= i <= n, Re lambda(i) <= x,...
Götze F, Tikhomirov A. THE CIRCULAR LAW FOR RANDOM MATRICES. ANNALS OF PROBABILITY. 2010;38(4):1444-...
AbstractConsider the empirical spectral distribution of complex random n×n matrix whose entries are ...
We explore the validity of the circular law for random matrices with non-i.i.d. entries. Let M be an...
Abridged and updated version of the Probability Survey MR2908617, prepared at the occasion of the AM...
Abridged and updated version of the Probability Survey MR2908617, prepared at the occasion of the AM...
Abstract. We show that, under some general assumptions on the entries of a random complex n × n matr...
We extend our recent result [22] on the central limit theorem for the linear eigenvalue statistics o...
AbstractConsider the empirical spectral distribution of complex random n×n matrix whose entries are ...
accepted in Journal of Theoretical ProbabilityInternational audienceLet $(X_{jk})_{j,k\geq 1}$ be an...
size n ? 50, you will see for yourself that a random matrix has structure. Experiments with the unif...
AbstractLetAbe annbynmatrix whose elements are independent random variables with standard normal dis...
Let A be an n by n matrix whose elements are independent random variables with standard normal distr...
AbstractLetAbe annbynmatrix whose elements are independent random variables with standard normal dis...
Abstract. Let Mn be a random matrix of size n×n and let λ1,..., λn be the eigenvalues of Mn. The emp...
Given an n x n complex matrix A, let mu(A)(x, y) := 1/n vertical bar{1 <= i <= n, Re lambda(i) <= x,...
Götze F, Tikhomirov A. THE CIRCULAR LAW FOR RANDOM MATRICES. ANNALS OF PROBABILITY. 2010;38(4):1444-...
AbstractConsider the empirical spectral distribution of complex random n×n matrix whose entries are ...
We explore the validity of the circular law for random matrices with non-i.i.d. entries. Let M be an...
Abridged and updated version of the Probability Survey MR2908617, prepared at the occasion of the AM...
Abridged and updated version of the Probability Survey MR2908617, prepared at the occasion of the AM...
Abstract. We show that, under some general assumptions on the entries of a random complex n × n matr...
We extend our recent result [22] on the central limit theorem for the linear eigenvalue statistics o...
AbstractConsider the empirical spectral distribution of complex random n×n matrix whose entries are ...
accepted in Journal of Theoretical ProbabilityInternational audienceLet $(X_{jk})_{j,k\geq 1}$ be an...
size n ? 50, you will see for yourself that a random matrix has structure. Experiments with the unif...