CEE262C Lecture 2: Nonlinear ODEs and Phase Diagrams

1. CEE262C Lecture 2: Nonlinear ODEs and Phase Diagrams Overview • Nonlinear chaotic ODEs: the damped nonlinear forced pendulum • 2nd Order damped harmonic oscillator • Systems of ODEs • Phase diagrams • Fixed points • Isoclines/Nullclines References: Dym, Ch 7; Mooney & Swift, Ch 5.2-5.3; Kreyszig, Ch 4 CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

2. Forced pendulum Frictional effect m m g CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

3. Free-body diagram CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

4. Derivation of the governing ODE CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

5. m CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

6. CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

7. Reduce and nondimensionalize! CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

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9. Governing nondimensional ODE CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

10. Linearize CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

11. The damped harmonic oscillator CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

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15. The particular solution CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

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17. Simulating the nonlinear system pendulum.zip CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

18. Phase plane analysis CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

19. Direction field for a1=0.5 phasedirection.m CEE262C Lecture 2: Nonlinear ODEs and phase diagrams 24

20. Computing phase lines analytically Solution in phase space Elliptic Integral! CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

21. Analytical Phase Lines for CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

22. Nullclines and fixed points CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

23. Plotting nullclines and fixed points q=0 (no acceleration) increasing friction p=0 (no velocity) Fixed points CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

24. where the point is a fixed point corresponding to Behavior in the vicinity of fixed points Suppose we have a nonlinear coupled set of ODEs in the form We can determine the behavior of this ODE in the vicinity of the fixed points by analyzing the behavior of disturbances applied to the fixed points such that CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

25. Using the Taylor series expansion about the fixed point, we have Substitution into the ODEs gives Since the fixed points satisfy CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

26. and , then the perturbations satisfy In vector form, this is given by The Jacobian matrix is given by CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

27. The behavior of the solution in the phase plane in the vicinity of the fixed points is determined by the behavior of the eigenvalues of the Jacobian. If then the eigenvalues of J are given by CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

28. complex pair, negative real part. two real negative roots. CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

29. complex pair, positive real part. two real positive roots. pure imaginary. CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

30. Phase plane analysis for the pendulum CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

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32. Underdamped Critical or overdamped CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

33. Spiral direction CW or CCW? Clockwise c<0 Counter- clockwise c>0 CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

34. Behavior around saddle point CEE262C Lecture 2: Nonlinear ODEs and phase diagrams

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36. CEE262C Lecture 2: Nonlinear ODEs and phase diagrams