Solution of the time-dependent Schrödinger equation with a trajectory method and application to H+-H scattering

An exact solution is obtained for the one-dimensional time-independent Schrijdineer equation with a symmetric double minimum potential constructed from two Morse potentials. This model potential is used to describe the inversion motions in NHa, NDa, and NTa, and its adequacy is discussed.

A general, energy-separable Faber polynomial representation of the full time-independent Green operator is presented. Non-Hermitian Hamiltonians are included, allowing treatment of negative imaginary absorbing potentials. A connection between the Faber polynomial expansion and our earlier Chebychev

A new version of solutions in the form of an exponentially weighted power series is constructed for the two-dimensional circularly symmetric quartic oscillators, which reflects successfully the desired properties of the exact wave function. The regular series part is shown to be the solution of a tr