Fabiano M. Andrade
Published 2014-03-24, updated 2014-04-02Version 2
In this work we calculate the exact Green's function for arbitrary rectangular potentials. Specifically we focus on Green's function for rectangular quantum wells enlarging the knowledge of exact solutions for Green's functions and also generalizing and resuming results in the literature. The exact formula has the form of a sum over paths and always can be cast into a closed analytic expression. From the poles and residues of the Green's function the bound states eigenenergies and eigenfunctions with the correct normalization constant are obtained. In order to show the versatility of the method, an application of the Green's function approach to extract information of quasi-bound states in rectangular barriers, where the standard analysis of quantum amplitudes fail, is presented.
Comments: 9 pages, 7 figures, few typos corrected, matches published version
Journal: Phys. Lett. A 378, 1461 (2014)
Huygens-Fresnel-Kirchhoff construction for quantum propagators with application to diffraction in space and time
Quantum propagator and characteristic equation in the presence of a chain of $δ$-potentials
The Dirac-Moshinsky Oscillator: Theory and Applications
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