Semiclassical Treatment of Diffraction in Billiard Systems with a Flux
  Line

F. Haake; G. Date; G. N. Watson; G. Vattay; H. Bruus; H. Bruus; H. Primack; H. Primack; I. S. Gradshteyn; J. B. Keller; J. R. J. Riddell; J. R. J. Riddell; M. Brack; M. Brack; M. C. Gutzwiller; M. L. Mehta; M. L. Tiago; M. Sieber; M. Sieber; M. V. Berry; M. V. Berry; Martin Sieber; N. Pavloff; N. Pavloff; O. Bohigas; R. E. Kleinman; S. M. Reimann; S. Olariu; Y. Aharonov

research

Semiclassical Treatment of Diffraction in Billiard Systems with a Flux Line

Authors: F. Haake
G. Date
G. N. Watson
G. Vattay
H. Bruus
H. Bruus
H. Primack
H. Primack
I. S. Gradshteyn
J. B. Keller
J. R. J. Riddell
J. R. J. Riddell
M. Brack
M. Brack
M. C. Gutzwiller
M. L. Mehta
M. L. Tiago
M. Sieber
M. Sieber
M. V. Berry
M. V. Berry
Martin Sieber
N. Pavloff
N. Pavloff
O. Bohigas
R. E. Kleinman
S. M. Reimann
S. Olariu
Y. Aharonov
Publication date: 1 January 1999
Publisher: 'American Physical Society (APS)'
Doi

Abstract

In billiard systems with a flux line semiclassical approximations for the density of states contain contributions from periodic orbits as well as from diffractive orbits that are scattered on the flux line. We derive a semiclassical approximation for diffractive orbits that are scattered once on a flux line. This approximation is uniformly valid for all scattering angles. The diffractive contributions are necessary in order that semiclassical approximations are continuous if the position of the flux line is changed.Comment: LaTeX, 17 pages, 4 figure