Almost global existence for some nonlinear Schr\"odinger equations on Td in low regularity

Abstract

We are interested in the long time behavior of solutions of the nonlinear Schr\"odinger equation on the d-dimensional torus in low regularity, i.e. for small initial data in the Sobolev space Hs0( Td) with s0>d/2. We prove that, even in this context of low regularity, the Hs-norms, s≥ 0, remain under control during times, T= (-||24|| ), exponential with respect to the initial size of the initial datum in Hs0, \|u(0)\|Hs0=. For this, we add to the linear part of the equation a random Fourier multiplier in ∞( Zd) and show our stability result for almost any realization of this multiplier. In particular, with such Fourier multipliers, we obtain the almost global well posedness of the nonlinear Schr\"odinger equation on Hs0( Td) for any s0>d/2 and any d≥1.