Moment method and the Schrödinger equation in the large N limit

In this paper, we show that the spatial discretization of the nonlinear SchrSdinger equation leads to a Hamiltonian system, which can be simulated with symplectic numerical schemes. In particular, we apply two symplectic integrators to the nonlinear SchrSdinger equation, and we demonstrate that the

## Abstract We revisit the question of an invariant measure for the focusing cubic Schrödinger equation on the line. For the periodic problem the appropriate ensemble was introduced by Lebowitz, Rose, and Speer [3] and proved to be invariant under the flow by McKean [5]. These parties and others ha

Orthogonal coordinate systems with helical geometry are constructed in euclidean 3-space and the Schrodinger equations in these coordinate systems are obtained. Of the two helical coordinate systems discussed, the external system consists of flat surfaces while the internal system consists of surfac