Putting dynamics into random matrix models leads to finitely many nonintersecting Brownian motions on the real line for the eigenvalues, as was discovered by Dyson. Applying scaling limits to the random matrix models, combined with Dyson’s dynamics, then leads to interesting, infinite-dimensional diffusions for the eigenvalues. This paper studies the relationship between two of the models, namely the Airy and Pearcey processes and more precisely shows how toapproximate the multi-time statistics for the Pearcey process by the one of the Airy process with the help of a PDE governing the gap probabilities for the Pearcey process
We determine the operator limit for large powers of random symmetric tridiagonal matrices as the siz...
This paper studies a number of matrix models of size n and the associated Markov chains for the eige...
This book explores the remarkable connections between two domains that, a priori, seem unrelated: Ra...
Putting dynamics into random matrix models leads to finitely many nonintersecting Brownian motions o...
The extended Airy kernel describes the space-time correlation functions for the Airy proces...
A few years ago, Aptekarev, Bleher and Kuijlaars have demonstrated, using an earlier result due to K...
In a celebrated paper, Dyson shows that the spectrum of a n × n random Hermitian matrix, diffusing a...
We consider the gap probability for the Pearcey and Airy processes; we set up a Riemann–Hilbert appr...
We consider the gap probability for the Pearcey and Airy processes; we set up a Riemann–Hilbert appr...
Using a systematic approach to evaluate Fredholm determinants numerically, we provide convincing evi...
We prove that matrix Fredholm determinants related to multi-time processes can be expressed in terms...
We define a new diffusive matrix model converging towards the β -Dyson Brownian motion for all β ∈ [...
We call "Dyson process" any process on ensembles of matrices in which the entries undergo d...
We prove that matrix Fredholm determinants related to multi-time processes can be expressed in terms...
Using a systematic approach to evaluate Fredholm determinants numerically, we provide convincing evi...
We determine the operator limit for large powers of random symmetric tridiagonal matrices as the siz...
This paper studies a number of matrix models of size n and the associated Markov chains for the eige...
This book explores the remarkable connections between two domains that, a priori, seem unrelated: Ra...
Putting dynamics into random matrix models leads to finitely many nonintersecting Brownian motions o...
The extended Airy kernel describes the space-time correlation functions for the Airy proces...
A few years ago, Aptekarev, Bleher and Kuijlaars have demonstrated, using an earlier result due to K...
In a celebrated paper, Dyson shows that the spectrum of a n × n random Hermitian matrix, diffusing a...
We consider the gap probability for the Pearcey and Airy processes; we set up a Riemann–Hilbert appr...
We consider the gap probability for the Pearcey and Airy processes; we set up a Riemann–Hilbert appr...
Using a systematic approach to evaluate Fredholm determinants numerically, we provide convincing evi...
We prove that matrix Fredholm determinants related to multi-time processes can be expressed in terms...
We define a new diffusive matrix model converging towards the β -Dyson Brownian motion for all β ∈ [...
We call "Dyson process" any process on ensembles of matrices in which the entries undergo d...
We prove that matrix Fredholm determinants related to multi-time processes can be expressed in terms...
Using a systematic approach to evaluate Fredholm determinants numerically, we provide convincing evi...
We determine the operator limit for large powers of random symmetric tridiagonal matrices as the siz...
This paper studies a number of matrix models of size n and the associated Markov chains for the eige...
This book explores the remarkable connections between two domains that, a priori, seem unrelated: Ra...