Finite-Dimensional Integrable Hamiltonian Systems Related to the Nonlinear Schrödinger Equation

The Discrete Nonlinear Schr6dinger equation, unlike its continuum counterpart, is nonintegrable in general. Here, we use Poincar6 spheres and spectral techniques to show some manifestations of chaos in this system. (.~ Crown copyright (1994).

In this the window of the Sobolev gradient technique to the problem of minimizing a Schrödinger functional associated with a nonlinear Schrödinger equation. We show that gradients act in a suitably chosen Sobolev space (Sobolev gradients) can be used in finite-difference and finite-element settings

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

Based on two types of expanding Lie algebras of a Lie algebra G, three isospectral problems are designed. Under the framework of zero curvature equation, three nonlinear integrable couplings of the nonlinear Schröding equations are generated. With the help of variational identity, we get the Hamilto