On the wellposedness for periodic nonlinear Schr\"odinger equations with white noise dispersion

Abstract

We consider a periodic nonlinear Schr\"odinger equation with white noise dispersion and a power nonlinearity given by equation* idu = u dWt + |u|p-1u\;dt equation* By proving stochastic Strichartz estimates, we are able to prove almost sure global wellposedness of this equation with L2 initial data for nonlinearities with exponent 1 < p ≤ 3. By generalizing the Fourier restriction spaces Xs,b to the stochastic setting, we also prove that our solutions agree with the ones constructed by Chouk and Gubinelli using rough path techniques. We also consider the quintic equation (p=5), and show that it is analytically illposed in L1ω Ct L2x.