Wavelet based in eigenvalue problems in quantum mechanics

A method is proposed which allows the scattering problem to reduce to the eigenvalue problem. Unlike the usual method when the scattering phase is extracted from the asymptotits of solution of the Cauchy problem at a given collision energy, in the proposed method the collision energy is obtained fro

The matrix form of the molecular orbital equations is that of a generalized eigenvalue eq~iation, when the basis functions are non-orthogonal. Five algorithms for the reduction of this equation to standardẽigenvalue form are analysed and compared. The behaviour of the algorithms as the overlap matri

The simple Lanczos process is very efficient for finding a few extreme eigenvalues of a large symmetric matrix. The main task in each iteration step consists in evaluating a matrix-vector product. It is shown how to apply a fast wavelet-based product in order to speed up computations. Some numerical