Random data Cauchy theory for the fourth order nonlinear Schr\"odinger equation with cubic nonlinearity

Abstract

We consider the Cauchy problem for the fourth order nonlinear Schr\"odinger equation with derivative nonlinearity (i∂ t + 2) u= ∂ (|u|2u) on R d, d 3, 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(R d) with ( d-52, d-56) < s, whose lower bound is below the scale critical regularity sc= d-32.