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Domain of Attraction

Domain of Attraction. Remarks on the domain of attraction Complete (total) domain of attraction Estimate of Domain of attraction : Lemma : The complete domain of attraction is an open, invariant set. Its boundary is formed by trajectories. might be positive. . could escape from.

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Domain of Attraction

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  1. Domain of Attraction • Remarks on the domain of attraction Complete (total) domain of attraction Estimate of Domain of attraction : Lemma : The complete domain of attraction is an open, invariant set. Its boundary is formed by trajectories

  2. might be positive  could escape from Consider Let be such that and Is in ? What is a good ? Consider

  3. Example Ex:

  4. Example (Continued)

  5. (i) (ii) (iii) (iv) Zubov’s Theorem

  6. Example Ex:

  7. Example (Continued) Solution:  

  8. Example (Continued)

  9. bounded bounded ? Advanced Stability Theory

  10. (1) Stability of time varying systems • Stability of time varying systems f is piecewise continuous in t and Lipschitz in x. Origin of time varying : (i) parameters change in time. (ii) investigation of stability of trajectories of time invariant system.

  11. Stability • Definition of stability

  12. Example Ex: Then Hence Then

  13. Example (Continued)

  14. Example (Continued)

  15. Example (Continued) There is another class of systems where the same is true – periodic system. Like Reason : it is always possible to find

  16. Positive definite function • Positive definite function Definition:

  17. positive definite decrescent Decrescent Thoerem:

  18. Decrescent (Continued) Proof : see Nonlinear systems analysis p.d, radially unbounded, not decrescent Ex: not l.p.d, not decrescent p.d, decrescent, radially unbounded p.d, not decrescent, not radially unbounded Finally

  19. Stability theorem • Stability theorem Thoerem:

  20. Stability theorem (Continued)

  21. Mathieu eq. decrescent positive definite Example Ex: Thus is uniformly stable.

  22. Theorem • Remark : LaSalle’s theorem does not work in general for time-varying system. But for periodic systems they work. So (uniformly) asymptotically stable. Theorem Suppose is a continuously differentiable p.d.f and radially unbounded with Define Suppose , and that contains no nontrivial trajectories. Under these conditions, the equilibrium point 0 is globally asymptotically stable.

  23. Example Ex:

  24. Example (Continued)

  25. Instability Theorem (Chetaev) • Instability Theorem (Chetaev)

  26. Linear time-varying systems and linearization • Linear time-varying systems and linearization

  27. Example Ex:

  28. Theorem Theorem: Proof : See Nonlinear systems analysis

  29. Lyapunov function approach • Lyapunov function approach

  30. Theorem Theorem: Proof : See Nonlinear systems analysis

  31. Converse (Inverse) Theorem & Invariance Theorem • Converse (Inverse) Theorem • i) if stable • ii) (uniformly asymptotically exponentially) stable • Invariance Theorem

  32. Theorem Theorem : Proof : See Ch 4.3 of Nonlinear Systems

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