English

Super-sharp resonances in chaotic wave scattering

Chaotic Dynamics 2012-03-27 v1

Abstract

Wave scattering in chaotic systems can be characterized by its spectrum of resonances, zn=EniΓn2z_n=E_n-i\frac{\Gamma_n}{2}, where EnE_n is related to the energy and Γn\Gamma_n is the decay rate or width of the resonance. If the corresponding ray dynamics is chaotic, a gap is believed to develop in the large-energy limit: almost all Γn\Gamma_n become larger than some γ\gamma. However, rare cases with Γ<γ\Gamma<\gamma may be present and actually dominate scattering events. We consider the statistical properties of these super-sharp resonances. We find that their number does not follow the fractal Weyl law conjectured for the bulk of the spectrum. We also test, for a simple model, the universal predictions of random matrix theory for density of states inside the gap and the hereby derived probability distribution of gap size.

Keywords

Cite

@article{arxiv.1201.3326,
  title  = {Super-sharp resonances in chaotic wave scattering},
  author = {Marcel Novaes},
  journal= {arXiv preprint arXiv:1201.3326},
  year   = {2012}
}
R2 v1 2026-06-21T20:05:15.413Z