Time splitting method for nonlinear Schr\"odinger equation with rough initial data in L2

Abstract

We establish convergence results related to the operator splitting scheme on the Cauchy problem for the nonlinear Schr\"odinger equation with rough initial data in L2, \ arrayll i∂t u + u = λ |u|p u, & (x,t) ∈ Rd × R+, u (x,0) =φ (x), & x∈Rd, array . where λ ∈ \-1,1\ and p >0. While the Lie approximation ZL is known to converge to the solution u when the initial datum φ is sufficiently smooth, the convergence result for rough initial data is open to question. In this paper, for rough initial data φ∈ L2 (Rd), we prove the L2 convergence of the filtered Lie approximation Zflt to the solution u in the mass-subcritical range, 0< p < 4d. Furthermore, we provide a precise convergence result for radial initial data φ∈ L2 (Rd).