Classical four-body problem in hyperspherical coordinates

A method proposed earlier by Aguilera, Moshinsky, and Kramer, for adapting a system of translationally invariant four-particle harmonic oscillator functions to the symmetry of the permutation group S(4), is applied to hyperspherical harmonic functions depending on three relative vectors. Except for

A possible extension to four particles of the hyperspherical coordinates initially introduced by Smith and Whitten for three particles is presented. Corresponding exact classical and quantum-mechanical Hamiltonians are then derived.

The propagation of the solution to the time-dependent Schrijdinger equation using grid methods has been investigated. The convergence of reaction probabilities with respect to the grid size as well as the efficiency of different propagation schemes (Chebyshev, Lanczos) and kinetic energy evaluation