Transactions of the Japan Society for Industrial and Applied Mathematics
Online ISSN : 2424-0982
ISSN-L : 0917-2246
Symplectic Integrators for Nonlinear Schrodinger Equation
Narimasa SasaHaruo Yoshida
Author information
JOURNAL FREE ACCESS

2000 Volume 10 Issue 2 Pages 119-131

Details
Abstract
Symplectic Integrators are developed for Nonlinear Schrodinger Equation regarded as Hamiltonian system of infinite degree of freedom. First order symplectic integrator for Nonlinear Schrodinger Equation is known as the split step fourier method. Higher order symplectic integrators are easily derived and enable us to perform fast and accurate numerical simulations.
Content from these authors
© 2000 The Japan Society for Industrial and Applied Mathematics
Previous article Next article
feedback
Top