Low regularity error estimates for the time integration of 2D NLS

Abstract

A filtered Lie splitting scheme is proposed for the time integration of the cubic nonlinear Schr\"odinger equation on the two-dimensional torus T2. The scheme is analyzed in a framework of discrete Bourgain spaces, which allows us to consider initial data with low regularity; more precisely initial data in Hs(T2) with s>0. In this way, the usual stability restriction to smooth Sobolev spaces with index s>1 is overcome. Rates of convergence of order τs/2 in L2(T2) at this regularity level are proved. Numerical examples illustrate that these convergence results are sharp.