Random data Cauchy problem for the nonlinear Schr\"odinger equation with derivative nonlinearity

Abstract

We consider the Cauchy problem for the nonlinear Schr\"odinger equation with derivative nonlinearity (i∂ t + ) u= ∂ (um) on d, d 1, with random initial data, where ∂ is a first order derivative with respect to the spatial variable, for example a linear combination of ∂∂ x1 , \, … , \, ∂∂ xd or |∇ |= F-1[| | F]. We prove that almost sure local in time well-posedness, small data global in time well-posedness and scattering hold in Hs( d) with s> ( d-1d sc , sc2, sc - d2(d+1) ) for d+m 5, where s is below the scaling critical regularity sc := d2-1m-1.