Anyone who's interested in chaos and dynamic systems must come along the Lotka-Volterra equations at
some point. And most of the times you find descriptions for it in 2 dimensions, with one predator and one prey
population. But there's more to it as John S. Costello showed in *Synchronisation of Chaos
in a Generalized Lotka-Volterra Atractor*

(The Nonlinear Journal Vol. 1, 1999 pp 11-17).

Let's see!

(The Nonlinear Journal Vol. 1, 1999 pp 11-17).

Let's see!

Find a wonderful explanation by Bret Victor here: Interactive
exploration of dynamical systems.

Another interpretation of the 2D systems can be found on the WebGL playground.