A new energy characterization of the smallest eigenvalue of the schrödinger equation

A recently developed method for calculation of eigenvalues is applied to a four coupled oscillator system previously used to test more approximate methods. Analysis is presented to show how the present method scales for systems of two, three, and four coupled oscillator systems.

The energy eigenvalues of coupled oscillators in two dimensions with quartic and sextic couplings have been calculated to a high accuracy. For this purpose, unbounded domain of the wave function has been truncated and various combination of trigonometric functions are employed as the basis sets in a

A variable-step method has been developed for the numerical solution of the eigenvalue Schrodinger 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 anal

The eigenvalue problem for a system of N coupled one-dimensional Schrodinger equations, arising in bound state in quantum mechanics, is considered. A canonical approach for the calculation of the energy eigenvalues of this system is presented. This method replaces the use of the wave functions by 2

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

Recently, we proposed an iteration method for solving the eigenvalue w problem of the time-independent Schrodinger equation H. Meißner and E. O. Steinborn, Ž .x Int. J. Quantum Chem. 61, 777 1997 . The eigenfunctions are expanded in terms of a Ž . basis set. The wave-function expansion coefficients