Multigrid and adaptive algorithm for solving the nonlinear Schrödinger equation

This paper is concerned with a new conservative finite difference method for solving the generalized nonlinear Schrödinger (GNLS) equation iu t + u xx + f (|u| 2 )u = 0. The numerical scheme is constructed through the semidiscretization and an application of the quartic spline approximation. Central

Recently an interesting new class of PDE integrators, multisymplectic schemes, has been introduced for solving systems possessing a certain multisymplectic structure. Some of the characteristic features of the method are its local nature (independent of boundary conditions) and an equal treatment of

A systematic improved comparison equation method to solve the Schrijdinger equation is described. The method is useful in quantum mechanical calculations inv&~ -0 or more titian or turning points and is applicable to real potentials with continuol;s derivatives. As a computatior 4 example of the met