Efficient, Reliable Computation of Resonances of the One-Dimensional Schrödinger Equation

The fmlte difference boundary value method wth a complex rotated coordmate IS used to obtain the resonances of the onednnensonal Schrodinger equation An example IS wnsldered which ylclds resonances wdh widths exceed= the real part of the enera

A method is proposed for reducing the multi-dimensional Schriidinger equation to a one\_dimensionaI integral equation. The reduction is exact; and the resulting integral equation although complicated, may be treated by any of a number of numerical methods. Two 24iniensional problems, the harmonic os

Physical problems which can usually be described with the help of sets of coupled second-order differential equations are outlined. In the case of scattering problems, the direct numerical integration of these equations is the unique method of obtaining a solution. For bound-state calculations this

The one-dimensional Schrodinger equation has been examined by means öf the confined system defined on a finite interval. The eigenvalues of the resulting bounded problem subject to the Dirichlet boundary conditions are calculated accurately to 20 significant figures using higher order shape function