In this letter we present an analytic method for calculating the transition probability between two random Gaussian matrices with given eigenvalue spectra in the context of Dyson Brownian motion. We show that in the Coulomb gas language, in large N limit, memory of the initial state is preserved in the form of a universal linear potential acting on the eigenvalues. We compute the likelihood of any given transition as a function of time, showing that as memory of the initial state is lost, transition probabilities converge to those of the static ensemble
The most classical problem in random matrix theory is to specify a natural joint distribution for th...
5 pag. + 7 pag. Suppl. Material. 3 FiguresInternational audienceWe study the statistics of the condi...
It is well known that the joint probability density of the eigenvalues of Gaussian ensembles of rand...
In this letter we present an analytic method for calculating the transition probability between two ...
In this paper we present an analytic method for calculating the transition probability between two r...
In this letter we present an analytic method for calculating the transition probability between two ...
We present an analytic method for calculating the transition probability between two random Gaussian...
In the last decade, spectral linear statistics on large dimensional random matrices have attracted s...
The theory of random matrices was introduced by John Wishart (1898–1956) in 1928. The theory was the...
This book explores the remarkable connections between two domains that, a priori, seem unrelated: Ra...
Consider the Dyson Brownian motion with parameter β, where β=1,2,4 corresponds to the eigenvalue flo...
We define a new diffusive matrix model converging towards the β -Dyson Brownian motion for all β ∈ [...
Abstract. Balian’s program of assigning a probability distribution to a random matrix is exploited t...
This thesis consists in two independent parts. The first part pertains to the study of eigenvectors ...
We consider real symmetric or complex hermitian random matrices with correlated entries. We prove lo...
The most classical problem in random matrix theory is to specify a natural joint distribution for th...
5 pag. + 7 pag. Suppl. Material. 3 FiguresInternational audienceWe study the statistics of the condi...
It is well known that the joint probability density of the eigenvalues of Gaussian ensembles of rand...
In this letter we present an analytic method for calculating the transition probability between two ...
In this paper we present an analytic method for calculating the transition probability between two r...
In this letter we present an analytic method for calculating the transition probability between two ...
We present an analytic method for calculating the transition probability between two random Gaussian...
In the last decade, spectral linear statistics on large dimensional random matrices have attracted s...
The theory of random matrices was introduced by John Wishart (1898–1956) in 1928. The theory was the...
This book explores the remarkable connections between two domains that, a priori, seem unrelated: Ra...
Consider the Dyson Brownian motion with parameter β, where β=1,2,4 corresponds to the eigenvalue flo...
We define a new diffusive matrix model converging towards the β -Dyson Brownian motion for all β ∈ [...
Abstract. Balian’s program of assigning a probability distribution to a random matrix is exploited t...
This thesis consists in two independent parts. The first part pertains to the study of eigenvectors ...
We consider real symmetric or complex hermitian random matrices with correlated entries. We prove lo...
The most classical problem in random matrix theory is to specify a natural joint distribution for th...
5 pag. + 7 pag. Suppl. Material. 3 FiguresInternational audienceWe study the statistics of the condi...
It is well known that the joint probability density of the eigenvalues of Gaussian ensembles of rand...