English

Green's function approach for quantum graphs: an overview

Quantum Physics 2016-08-22 v2 Mathematical Physics math.MP

Abstract

Here we review the many aspects and distinct phenomena associated to quantum dynamics on general graph structures. For so, we discuss such class of systems under the energy domain Green's function (GG) framework. This approach is particularly interesting because GG can be written as a sum over classical-like paths, where local quantum effects are taking into account through the scattering matrix amplitudes (basically, transmission and reflection amplitudes) defined on each one of the graph vertices. Hence, the {\em exact} GG has the functional form of a generalized semiclassical formula, which through different calculation techniques (addressed in details here) always can be cast into a closed analytic expression. It allows to solve exactly arbitrary large (although finite) graphs in a recursive and fast way. Using the Green's function method, we survey many properties for open and closed quantum graphs as scattering solutions for the former and eigenspectrum and eigenstates for the latter, also considering quasi-bound states. Concrete examples, like cube, binary trees and Sierpi\'{n}ski-like topologies are presented. Along the work, possible distinct applications using the Green's function methods for quantum graphs are outlined.

Keywords

Cite

@article{arxiv.1601.01018,
  title  = {Green's function approach for quantum graphs: an overview},
  author = {Fabiano M. Andrade and A. G. M. Schmidt and E. Vicentini and B. K. Cheng and M. G. E. da Luz},
  journal= {arXiv preprint arXiv:1601.01018},
  year   = {2016}
}

Comments

54 pages, 24 figures, 1 table. Two sections expanded + minor modifications. One appendix added. References added. To appear in Physics Reports

R2 v1 2026-06-22T12:23:42.181Z