On The Energy Transfer To High Frequencies In The Damped/Driven Nonlinear Schr\"odinger Equation (Extended Version)

Abstract

We consider a damped/driven nonlinear Schr\"odinger equation in an n-cube Kn⊂Rn, n is arbitrary, under Dirichlet boundary conditions \[ ut- u+i|u|2u=η(t,x), x∈ Kn, u|∂ Kn=0, >0, \] where η(t,x) is a random force that is white in time and smooth in space. It is known that the Sobolev norms of solutions satisfy \| u(t)\|m2 C-m, uniformly in t0 and >0. In this work we prove that for small >0 and any initial data, with large probability the Sobolev norms \|u(t,·)\|m of the solutions with m>2 become large at least to the order of -n,m with n,m>0, on time intervals of order O(1).