Nonlinear Sciences – Chaotic Dynamics
Scientific paper
2001-11-28
Nonlinearity, v15, 1541 (2002)
Nonlinear Sciences
Chaotic Dynamics
Revised version. 66 pages, 12 figures
Scientific paper
10.1088/0951-7715/15/5/311
The form factor $K(\tau)$ is calculated analytically to the order $\tau^3$ as well as numerically for a rectangular billiard perturbed by a $\delta$-like scatterer with an angle independent diffraction constant, $D$. The cases where the scatterer is at the center and at a typical position in the billiard are studied. The analytical calculations are performed in the semiclassical approximation combined with the geometrical theory of diffraction. Non diagonal contributions are crucial and are therefore taken into account. The numerical calculations are performed for a self adjoint extension of a $\delta$ function potential. We calculate the angle dependent diffraction constant for an arbitrary perturbing potential $U({\bf r})$, that is large in a finite but small region (compared to the wavelength of the particles that in turn is small compared to the size of the billiard). The relation to the idealized model of the $\delta$-like scatterer is formulated. The angle dependent diffraction constant is used for the analytic calculation of the form factor to the order $\tau^2$. If the scatterer is at a typical position, the form factor is found to reduce (in this order) to the one found for angle independent diffraction. If the scatterer is at the center, the large degeneracy in the lengths of the orbits involved leads to an additional small contribution to the form factor, resulting of the angle dependence of the diffraction constant. The robustness of the results is discussed.
Fishman Shmuel
Rahav Saar
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