Intro to Chaos and Fractals: Summary

Big Ideas

Chaos: A deterministic system that is bounded and aperiodic and shows sensitive dependence on initial conditions.
Fractals: Geometric objects that are self-similar across many scales. Usually have non-integer dimension.
A simple deterministic system can produce unpredictable results. Example: Logistic equation, Lorenz equations.
A simple deterministic system can produce complicated, ordered behavior, e.g. period 32 or period 17 cycles in logistic equation.
Mathematical models are sometimes not used for prediction, but instead to gain a qualitative feel for a system.
Math and physics are living, human endeavors. Math and physics are, in a variety of ways, informed by art, literature, aesthetic concerns.
Some features of chaotic transitions are universal. Example: Feigenbaum number from the logistic equation is the same as the number measured experimentally in turbulence experiments.
Fractals can be produced by simple iterated processes. Example: forming fractals by successive removals.
Fractals can also be produced by random processes. Example: "The Chaos game."
Strange Attractors: Attractors of dynamical systems that are of a dimension smaller than the phase space, and often fractal. Motion on the attractor, however, is chaotic. This is an example of structure or pattern within chaos or disorder.
Julia sets: The set of all initial conditions that do not fly off to infinity for a particular iterated function.
The Mandelbrot set: an encyclopedia of Julia sets. The Mandlebrot set is the set of all C values for which the Julia set of f(x) = x^2 + C is connected. Equivalently, The M-set is the set of all C values for which the orbit of 0 under f(x) = x^2 + C is bounded.

Really Big Idea

Order? Disorder? Order can give rise to disorder and disorder can give rise to order.

Broader Implications of Chaos + Fractals?

Definitely started a small trend toward interdisciplinarity. More common now for mathematicians, physicists, biologists, economists, etc., to talk to each other and collaborate.
Helped return physicists' attention to everyday-scale phenomena, as opposed to the very small, very big, very fast, etc.
Provided some new methods: phase space embedding, determining dimensions. These methods have proved useful in variety of fields.
Important lessons about "causes" of order and pattern and disorder. What needs explaining? What sort of explanations should we seek?
Chaos and fractals provide a language that is appropriate for describing and thinking about a wide range of natural phenomena.
Chaos is still a relatively minor sub-field of physics. Chaos was not a revolution in the sense that Quantum Mechanics or Evolution or Plate Tectonics. Chaos is not really a theory.
Nevertheless, chaos and fractals are fun (at least to many people) and are an important and still growing area of study.

[Dave] [Chaos and Fractals] [COA]

Web page maintained by dave@hornacek.coa.edu.