Error estimates at low regularity of splitting schemes for NLS

Abstract

We study a filtered Lie splitting scheme for the cubic nonlinear Schr\"odinger equation. We establish error estimates at low regularity by using discrete Bourgain spaces. This allows us to handle data in Hs with 0<s<1 overcoming the standard stability restriction to smooth Sobolev spaces with index s>1/2 . More precisely, we prove convergence rates of order τs/2 in L2 at this level of regularity.