The butterfly that started chaos theory. dx/dt = σ(y-x), dy/dt = x(ρ-z)-y, dz/dt = xy-βz
σ:
10
ρ:
28
β:
2.7
Edward Lorenz, 1963. A simplified model of atmospheric convection that revealed
deterministic chaos. The system never repeats, never settles, never escapes.