Recent Progress in Symplectic Algorithms for Use in Quantum Systems

Authors

  • X. S. Liu, Y. Y. Qi, J. F. He & P. Z. Ding

Abstract

In this paper we survey recent progress in symplectic algorithms for use in quantum systems in the following topics: Symplectic schemes for solving Hamiltonian systems; Classical trajectories of diatomic systems, model molecule A2B, Hydrogen ion H2+ and elementary atmospheric reaction N(4S)+O2(X3Σ8)→NO(X2Π)+O(3P) calculated by means of Runge-Kutta methods and symplectic methods; the classical dissociation of the HF molecule and classical dynamics of H2+ in an intense laser field; the symplectic form and symplectic-scheme shooting method for the time-independent Schrödinger equation; the computation of continuum eigenfunction of the Schrödinger equation; asymptotic boundary conditions for solving the time-dependent Schrödinger equation of an atom in an intense laser field; symplectic discretization based on asymptotic boundary condition and the numerical eigenfunction expansion; and applications in computing multi-photon ionization, above-threshold ionization, Rabbi oscillation and high-order harmonic generation of laser-atom interaction.

Published

2007-02-01

Issue

Section

Articles