Solving the Schrödinger equation for bound states

Two computer programs (FGHEVEN and FGHFFT) for solving the one-dimensional Schrodinger equation for bound-state eigenvalues and eigenfunctions are presented. Both computer programs are based on the Fourier grid Hamiltonian method (J. Chem. Phys. 91(1989) 3571). The method is exceptionally simple and

An eigenvalue corrector is given for solving bound states in multichannel Schrodinger equations. Using the renonnalized Numerov method the multichannel equation is integrated from both left and right to the middle. The integrations define an approximate solution which is used to calculate the eigenv

To avoid instability problems in calculating anti-bound and resonant solutions, we propose to represent the wave-function with the sum of its large distance asymptotic form and a numerically calculated correction function. The resulting inhomogeneous equation is stable, therefore it can be solved ac