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Lab 8: The onset of chaos Unpredictable dynamics of deterministic systems, often found in non-linear systems. Background of chaos Logistic Equation Non-linear.

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Presentation on theme: "Lab 8: The onset of chaos Unpredictable dynamics of deterministic systems, often found in non-linear systems. Background of chaos Logistic Equation Non-linear."— Presentation transcript:

1 Lab 8: The onset of chaos Unpredictable dynamics of deterministic systems, often found in non-linear systems. Background of chaos Logistic Equation Non-linear RLC circuit.

2 What is Chaos? Chaos  Random
In common usage, “chaos” means random, i.e. disorder. However, this term has a precise definition that distinguish chaos from random. Chaos  Random Chaos: When the present determines the future, but the approximate present does not approximately determine the future. -Edwards Lorenz

3 Chaos theory Chaos theory studies the behavior of dynamical systems that are highly sensitive to initial conditions, an effect which is popularly referred to as the butterfly effect. Predictability: Does the Flap of a Butterfly’s Wings in Brazil set off a Tornado in Texas? -Edward Lorentz, AAAS, (1972) Edward Norton Lorenz

4 Applications of Chaos theory
meteorology sociology physics engineering aerodynamics economics biology philosophy. Is there any universal behavior in chaos phenomena?

5 Logistic equation Logistic equation has been used to model population swing of organisms, e.g. lemmings. x(n): n-th year’s population; a: growth parameter, i.e. birth/death; [1- x(n)]: competition within population. The grand challenge: what is the steady state of the organism’s population in the long run (n  )? How does it depends on growth parameter a? Run LabView program

6 Is there any universal behavior?
Logistic equation It depends on the growth parameter a. Is there any universal behavior?

7 Logistic equation and onset of chaos
Mitchell Feigenbaum (July 1978) "Quantitative universality for a class of nonlinear transformations," Journal of Statistical Physics, vol. 19, no. 1, pages 25–52.

8 How to find out  and S from measurements?
Feigenbaum number is a universal number for non-linear dynamical systems

9 Complex but organized structure inside chaos
Another universal feature; Emergent complexity

10 Another example: non-linear RLC circuit

11 Linear RLC circuit  harmonic motion
Non-linear RLC circuit  aharmonic motion

12 Nonlinear capacitor: p-n junction

13 Non-linear RLC circuit

14 Before bifurcation

15 After bifurcation P. Linsey, PhysRevLett (1981).

16 Lissajous curve

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