Filtered Lie-Trotter splitting for the "good" Boussinesq equation: low regularity error estimates

Abstract

We investigate a filtered Lie-Trotter splitting scheme for the ``good" Boussinesq equation and derive an error estimate for initial data with very low regularity. Through the use of discrete Bourgain spaces, our analysis extends to initial data in Hs for 0<s≤ 2, overcoming the constraint of s>1/2 imposed by the bilinear estimate in smooth Sobolev spaces. We establish convergence rates of order τs/2 in L2 for such levels of regularity. Our analytical findings are supported by numerical experiments.