Massive bifurcation of chaotic scattering

This paper presents numerical evidence that in quantum systems with chaotic classical dynamics, the number of scattering resonances near an energy E scales like h --(D(K E )+1)/2 as h -→ 0. Here, K E denotes the subset of the energy surface {H = E} which stays bounded for all time under the flow gen

The fluxon dynamics of a long Josephson junction (LJJ) is investigated numerically. The effect of the surface resistance of the superconductor on the bifurcation phenomenon is examined in detail. We show the occurrence of a period doubling route to chaos and the reappearance of low order periodic mo

A classical, chaotic scatterer consisting of three, equal-sized, equidistant hard discs, also known as the Gaspard-Rice system [Gaspard P, Rice SA. Scattering from a classically chaotic repellor. J Chem Phys 1989;90(4):2225-2241] is studied in the presence of white noise. The fractal dimension of th