Informally, a dynamic system is any physical system that evolves with time (e.g., a pendulum, a planet orbiting the sun, the weather, etc). From a more mathematically precise perspective, one can consider a function mapping a space to itself. For example, f(x)=x^2 defined on the set of real numbers. Using this formulation, time is represented by iterating the function. In the example f(x)=x^2, if the initial value is 2, then after one unit of time, the value is f(2)=4, after two units of time, the value is f(f(2))=f(4)=16 and so on.
We will discuss a number of explicit examples of dynamical systems and the precise mathematical formulation of chaos. We will also learn the answer to the question: why is my dad's favorite number 6174?
Dynamical systems, chaos, and my dad's favorite number