A new propagation method for the radial Schrödinger equation

A method has been developed for the numerical solution of the eigenvalue Schrfdinger equation. The eigenvalues are computed directly as roots of a function known in transmission line theory as the impedance. The novel numerical algorithm is based also on the piecewise perturbation analysis. The new

In the framework of nonrelativistic quantum mechanics in 3 dimensions, we propose a new way of calculating the energies of the 1l-states from the properties of the 1s-state. The method is based on the generalized Bertlmann Martin inequalities, corrected to obtain approximative relationships relating

A new integral equation method for the numerical solution of the radial Schrödinger equation in one dimension, developed by the authors (1997, J. Comput. Phys. 134, 134), is extended to systems of coupled Schrödinger equations with both positive and negative channel energies. The method, carried out

We describe the application of block Gauss-Seidel and block Jacobi iterative methods to the design of implicit propagators for finite-difference models of the time-dependent Schrrdinger equation. The block-wise iterative methods discussed here are mixed direct-iterative methods for solving simultane