Error estimates of the time-splitting methods for the nonlinear Schr\"odinger equation with semi-smooth nonlinearity

Abstract

We establish error bounds of the Lie-Trotter time-splitting sine pseudospectral method for the nonlinear Schr\"odinger equation (NLSE) with semi-smooth nonlinearity f() = σ, where =||2 is the density with the wave function and σ>0 is the exponent of the semi-smooth nonlinearity. Under the assumption of H2 -solution of the NLSE, we prove error bounds at O(τ12+σ + h1+2σ) and O(τ + h2) in L2 -norm for 0<σ≤12 and σ≥12, respectively, and an error bound at O(τ12 + h) in H1 -norm for σ≥ 12, where h and τ are the mesh size and time step size, respectively. In addition, when 12<σ<1 and under the assumption of H3 -solution of the NLSE, we show an error bound at O(τσ + h2σ) in H1 -norm. Two key ingredients are adopted in our proof: one is to adopt an unconditional L2 -stability of the numerical flow in order to avoid an a priori estimate of the numerical solution for the case of 0 < σ ≤ 12, and to establish an l∞ -conditional H1 -stability to obtain the l∞ -bound of the numerical solution by using the mathematical induction and the error estimates for the case of σ 12; and the other one is to introduce a regularization technique to avoid the singularity of the semi-smooth nonlinearity in obtaining improved local truncation errors. Finally, numerical results are reported to demonstrate our error bounds.