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Replying to @graveolens
What's cool about your system is to see these waves pulsing on this reconnection. Can you describe the value of 'lambda' on this point, if you recognize some kind of colision between fixed points (stable/unstable), you can say that you have an 'explosion', as I did.pic.twitter.com/QI2dtg0oNM
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Replying to @Albertotufaile
So what's intriguing -- and will be apparent later when I post the source/algorithm, is that A. this seems to live on the plane where fixed points, saddle points, indifferent rings live. (c.f. previous comments about discrete dynamical systems phase spaces and Bessel funcs)
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Replying to @graveolens @Albertotufaile
B. the system takes the mouse position as input, produces some complex numbers from that, and uses those for in flight modification of a complex discrete dynamical system (no ode s were solved in the course of making this)
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and C. It is not clear to me how to eke out a bifurcation diagram from this. It is clear that we may to need new techniques for complex flows like this (as opposed to the trajectory of a real^n point) [so I have to precisely document how I did this, soon]
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