A fully discrete low-regularity integrator for the nonlinear Schr\"odinger equation

Abstract

For the solution of the cubic nonlinear Schr\"odinger equation in one space dimension, we propose and analyse a fully discrete low-regularity integrator. The scheme is explicit and can easily be implemented using the fast Fourier transform with a complexity of O(N N) operations per time step, where N denotes the degrees of freedom in the spatial discretisation. We prove that the new scheme provides an O(τ32γ-12-+N-γ) error bound in L2 for any initial data belonging to Hγ, 12<γ≤ 1, where τ denotes the temporal step size. Numerical examples illustrate this convergence behavior.