Averaging of dispersion managed nonlinear Schr\"odinger equations

Abstract

We consider the dispersion managed power-law nonlinear Schr\"odinger(DM NLS) equations with a small parameter > 0 and the averaged equation, which are used in optical fiber communications. We prove that the solutions of DM NLS equations converge to the solution of the averaged equation in H1(R) as goes to zero. Meanwhile, in the positive average dispersion, we obtain the global existence of the solution to DM NLS equation in H1(R) for sufficiently small > 0, even when the exponent of the nonlinearity is beyond the mass-critical power.