Guilherme Silva: Multiplicative statistics of random matrices and the integro-differential Painlevé II equation
Time: Tue 2022-05-10 15.15 - 16.15
Video link: Meeting ID: 698 3346 0369
Participating: Guilherme Silva (Universidade de São Paulo)
In this talk we consider a large family of multiplicative statistics of eigenvalues of hermitian random matrix models with a one-cut regular potential. We show that they converge to an universal multiplicative statistics of the Airy2 point process which, in turn, is described in terms of a particular solution to the integro-differential Painlevé II equation. The same solution to this integro-differential equation appeared for the first time in the description of the narrow wedge solution to the KPZ equation, so our results connect the KPZ equation in finite time with random matrix theory in an universal way.
The talk is based on joint work with Promit Ghosal (MIT).