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Department of Physics

ΕΛΕ06

10ΕΛΕ06 Non-Linear Dynamical Systems

Course webpage:  https://eclass.uoa.gr/courses/PHYS289

Course outline

Course content

  • Dynamical systems as continuous flows in phase space and as maps. Equilibrium points and stability. Bifurcations in one-dimensional systems.
  • Two-dimensional dynamical systems. Linear dynamics in two dimensions.
    Poincaré-Bendixson theorem. Limit cycles. Hopf bifurcation. Stability of limit cycles. Parametric instability.
  • Non-linear oscillations. Perturbation methods. Method of multiple time scales.
  • Introduction to chaotic dynamics. Lorenz system. Lyapunov exponents.
  • Quasi-linear 1st order partial differential equations. Characteristics and formation of shock waves and applications. Burgers equation.
  • Non-linear waves. Boussinesq equations. Korteweg-de Vries and non-linear Schrödinger equations. Introduction to soliton theory.