Chaotic maps

moon of Saturn

classical mechanics problem of three massive point particles interacting via Newtonian gravity; special case of the 𝑛‐body problem for 𝑛=3

System of ordinary differential equations first studied by Edward Lorenz

pendulum with another pendulum attached to its end

electronic oscillator

Simple polynomial map exhibiting chaotic behavior

non-conservative oscillator with non-linear damping

chaotic dynamical system introduced by Michel Hénon

electronic circuit to exhibits chaos theory behaviour

attractor for chaotic Rössler system

class of chaotic maps of the square into itself

non-linear second order differential equation and its attractor

chaotic map from the torus into itself

thumb|right|350px|Top: The Brusselator in the unstable regime (A=1, B=3): The system approaches a limit cycle Bottom: The Brusselator in a stable regime with A=1 and B=1.7: For B2 the system is stable and approaches a fixed point.

area-preserving chaotic map from a square with side 2π onto itself

a swinging pendulum that is also elastic

phenomenon in maths

model of multi-species population dynamics

chaotic map from the unit square into itself

Mathematical map