Pavel Stránský
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Last updated: 26.11.2024

Dynamics of the Creagh-Whelan potential

Notes (pdf)
Thermodynamics (pdf)
Geometrical method (pdf)
Oscillating part of level density (pdf)
Hamiltonian
A=-2A=-1A=0A=1A=2
Potential A=-2Potential A=-1Potential A=0Potential A=1Potential A=2
Figure 1. Equipotential surfaces (up to energy E=2.5).
Potential y=0, A=-2Potential y=0, A=-1Potential y=0, A=0Potential y=0, A=1Potential y=0, A=2
Figure 2. Section y=0 of the potential. The red lines indicate energies of the Poincaré sections in Figure 4.
freg
Figure 3. (A; E) Classical regularity freg (white-regular: freg=1, black-chaotic: freg=0).
Green dashed lines separate regions of a fully convex border of the kinematically accessible region from a partly concave one.
Red solid lines correspond with the positions of the stationary points of the potential (critical triangle).
Blue points indicate energies of the Poincaré secions in Figure 4.
Poincaré section A=-2, E=5Poincaré section A=-1, E=5Poincaré section A=0, E=5Poincaré section A=1, E=5Poincaré section A=2, E=5
Poincaré section A=-2, E=4Poincaré section A=-1, E=4Poincaré section A=0, E=4Poincaré section A=1, E=4Poincaré section A=2, E=4
Poincaré section A=-2, E=3Poincaré section A=-1, E=3Poincaré section A=0, E=3Poincaré section A=1, E=3Poincaré section A=2, E=3
Poincaré section A=-2, E=2Poincaré section A=-1, E=2Poincaré section A=0, E=2Poincaré section A=1, E=2Poincaré section A=2, E=2
Poincaré section A=-2, E=1.5Poincaré section A=-1, E=1.5Poincaré section A=0, E=1.5Poincaré section A=1, E=1.5Poincaré section A=2, E=1.5
Poincaré section A=-2, E=1.2Poincaré section A=-1, E=1.2Poincaré section A=0, E=1.2Poincaré section A=1, E=1.2Poincaré section A=2, E=1.2
Poincaré section A=-2, E=1Poincaré section A=-1, E=1Poincaré section A=0, E=1Poincaré section A=1, E=1Poincaré section A=2, E=1
Poincaré section A=-2, E=0.8Poincaré section A=-1, E=0.8Poincaré section A=0, E=0.8Poincaré section A=1, E=0.8Poincaré section A=2, E=0.8
Poincaré section A=-2, E=0.5Poincaré section A=-1, E=0.5Poincaré section A=0, E=0.5Poincaré section A=1, E=0.5Poincaré section A=2, E=0.5
Figure 4. Poincaré sections (x, px; y=0).
Frequencies
Figure 5. Frequencies of the harmonic oscillations in the minima (the blue and the red line correspond to the left and the right minimum, respectively; the solid and the dashed line correspond to the x and y direction, respectively). Green thick lines show the ratio of the frequencies y:x (the rigidity ratio) in both minima.
hbar=0.2
Level dynamics hbar=0.2Peres lattice <x> hbar=0.2
Figure 6. (A; E) Level dynamics.
The intensity of the red color shades expresses the classical chaoticity (see Figure 3, if present).
Green dashed lines separate regions of a fully convex border of the kinematically accessible region from a partly concave one.
Red solid lines correspond with the positions of the stationary points of the potential (critical triangle).
Click on the Figure to see the smoothed level dynamics (oscillating part of the level density).
Figure 7. (x; E) Peres lattice for x=<x> (horizontal axis) and E=<H> (vertical axis).
Green dashed lines separate regions of a fully convex border of the kinematically accessible region from a partly concave one.
Red solid line shows the potential shape V(x, y=0).
Blue solid line gives the classical measure of regularity freg(E) on the horizontal axis.