注:报告人要求不录像!
Title:GIBBS MEASURE FOR THE FRACTIONAL NONLINEAR SCHRöDINGER EQUATIONS
Speaker:Chenmin Sun (Universite Cergy-Pointoise)
Time:2019年8月16日 下午 16:00-17:00
Room:东区管理科研楼 365英国上市官网1418室
Abstract:We consider the fractional nonlinear Schr¨odinger equation with cubic nonlinearity:
$$i/partial_tu-(-/partial_x^2)^{/alpha/2}u=|u|^2u./eqno(0.1)$$
(0.1) is a Hamiltonian system with conserved energy
$$H(u)=/int_{/mathbb{T}}/left({1/over 2}|D^{/alpha/2}u|^2+{1/over 4} |u|^4/right)dx.$$
The case $/alpha=2$ corresponds to the classical nonlinear Schr/¨odinger equation. I will first explain the construction of its Gibbs measure, which is formally of the form $d/mu=e^{-H(u)}du$, for the strong dispersive case $/alpha>1$. For the weak dispersive case $/alpha/leq 1$, a renormalization procedure is needed, in order to make sense of the formal expression. Next I will discuss three methods for construting global dynamics on the support of the Gibbs measure, according to the value of $/alpha$. This talk is based on a joint work with N. Tzvetkov.
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