A simplified shooting method for the diatomic Eigenvalue problem

The shooting method is a numerically effective approach to solving certain eigenvalue problems, such as that arising from the Schrodinger equation for the ẗwo-dimensional hydrogen atom with logarithmic potential function. However, no complete proof of its rationale and correctness has been given unt

This paper describes a set of subprograms to calculate accurate eigenvalues of the radial Schrbdinger equation using a recent simplified shooting method. A total of nine subprograms were written to deal with three different potentials (Morse, Lennard-Jones and RKR) using one of three difference equa

The determination of the vibration-rotation eigenvalues (for an electronic state of a diatomic molecule) is done using various algorithms, where the differential equation y" + Rr)y = 0 (with given initial values yo and y ; at an origin ro) is to be integrated, that is, to be replaced by a "convenien

A frequency condensation method is presented for solving the eigenvalue problem of a large matrix system. The eigenproblem is reduced to a smaller problem by condensing the stiness and mass matrices. As distinct from the Guyan method, the frequency condensation method is based on approximation prese

The problem of the determination of the vibration-rotation eigenvalue in diatomic molecules is considered. An eigenvalue equation totally independent from the eigenfunction is written for any potential, analytical or numerical. This equation uses uniquely the vibration-rotation canonical functions;