题目：Gap probability near the cusp singularity in random matrix ensembles
时间：2021年9月24日 (星期五), 13:50-14:50
腾讯会议 ID：802 744 029
摘要：We study the gap probability of finding no eigenvalues near the cusp singularity in random matrix ensembles. It was known that the cusp singularity leads to a new universal determinantal process characterized by the Pearcey kernel. By studying the Pearcey-kernel determinant, we establish an integral representation of the gap probability in terms of the Hamiltonian of a system of nonlinear differential equations. Together with some remarkable differential identities for the Hamiltonian, this allows us to obtain the asymptotics of the gap probability as the size of the gap tends to infinity. This talk is based on joint work with Dan Dai and Lun Zhang.
个人简介：徐帅侠，中山大学教授，主要研究方向是渐近分析、随机矩阵理论和Painleve方程。主要研究工作发表在Communications in Mathematical Physics、SIAM Journal on Mathematical Analysis 和 Journal of Differential Equations 等期刊。