Hamiltonian Chaos - Demo 2

2D Circle Map: .... and Area Preserving.

Now look at the same parameters except b=1. For each demonstration click on various points of the running plot to start from new initial conditions.

a=0.8
a=1
a=1.2

You should find a rich variety of behavior for each set of parameters with

Tori (appearing as curves traversing the plot) that are remnants of the tori of the integrable system a=0. These curves have irrational winding number, i.e. quasiperiodic motion.
"Island chains" of elliptical orbits (tori) surrounding discrete points giving finite winding number corresponding to frequency locked orbits.
Chaotic orbits that are most easily found in the hyperbolic regions between two elliptical islands.

The structure is very rich: if you enlarge various regions of the plot you will find the same range of behavior repeated on smaller and smaller scales. (Remember you can reset the scales by clicking outside a stopped plot.) As a increases the chaotic orbits become more evident and more of the tori break down.

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Last modified Sunday, March 5, 2000
Michael Cross