Uniform error bound of an exponential wave integrator for the long-time dynamics of the nonlinear Schr\"odinger equation with wave operator

Abstract

We establish the uniform error bound of an exponential wave integrator Fourier pseudospectral (EWI-FP) method for the long-time dynamics of the nonlinear Schr\"odinger equation with wave operator (NLSW), in which the strength of the nonlinearity is characterized by 2p with ∈ (0, 1] a dimensionless parameter and p ∈ N+. When 0 < 1, the long-time dynamics of the problem is equivalent to that of the NLSW with O(1)-nonlinearity and O()-initial data. The NLSW is numerically solved by the EWI-FP method which combines an exponential wave integrator for temporal discretization with the Fourier pseudospectral method in space. We rigorously establish the uniform H1-error bound of the EWI-FP method at O(hm-1+2p-βτ2) up to the time at O(1/β) with 0 ≤ β ≤ 2p, the mesh size h, time step τ and m ≥ 2 an integer depending on the regularity of the exact solution. Finally, numerical results are provided to confirm our error estimates of the EWI-FP method and show that the convergence rate is sharp.