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Table of Contents
Differential Equations as Dynamical Systems
Stability of fixed points
Difference equations as dynamical systems
Classification of fixed points
Hamiltonian systems
Numerical Methods.-Strange Attractors and Maps of an Interval
Stable, Unstable and Centre manifolds.-Dynamics in the Centre Manifold
Lyapunov Exponents and Oseledets Theorem
Chaos
Limit and Recurrent Sets.-Poincare Maps
The Poincare-Bendixon Theorem
Bifurcations of Differential Equations.-Singular Pertubations and Ducks.-Strange Attractors in Delay Equations
Complexity of Strange Attractors.-Intermittency
Cellular Automata
Maps of the Complex Plane
Stochastic Iteration of Function Systems
Linear Maps on the Torus and Symbolic Dynamics
Parametric Resonance
Robot Motion
Synchronisation of Pendula
Synchronisation of Clocks
Chaos in Stormer Problem.-Introduction to Celestial mechanics
Introduction to non-Liner control Theory
Appendices.
Stability of fixed points
Difference equations as dynamical systems
Classification of fixed points
Hamiltonian systems
Numerical Methods.-Strange Attractors and Maps of an Interval
Stable, Unstable and Centre manifolds.-Dynamics in the Centre Manifold
Lyapunov Exponents and Oseledets Theorem
Chaos
Limit and Recurrent Sets.-Poincare Maps
The Poincare-Bendixon Theorem
Bifurcations of Differential Equations.-Singular Pertubations and Ducks.-Strange Attractors in Delay Equations
Complexity of Strange Attractors.-Intermittency
Cellular Automata
Maps of the Complex Plane
Stochastic Iteration of Function Systems
Linear Maps on the Torus and Symbolic Dynamics
Parametric Resonance
Robot Motion
Synchronisation of Pendula
Synchronisation of Clocks
Chaos in Stormer Problem.-Introduction to Celestial mechanics
Introduction to non-Liner control Theory
Appendices.