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Syllabus. Phenomena of nonlinear dynamics Second order systems Mathematical foundation Lyapunov stability Variable gradient method Advanced stability theory Input-output stability Averaging method Singular perturbations Absolute stability Describing function method
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Syllabus • Phenomena of nonlinear dynamics • Second order systems • Mathematical foundation • Lyapunov stability • Variable gradient method • Advanced stability theory • Input-output stability • Averaging method • Singular perturbations • Absolute stability • Describing function method • Exact feedback linearization • Lyapunov redesign • Back-stepping • Sliding mode control • High gain observers Lecture notes will be available at Website : http://ece.clemson.edu/crb/ece874/main.htm The relative importance of homeworks and tests on determining the final grade will be as follows : Homeworks 10% Mid - term exam 40% Final Exam 50%
General Considerations • Nonlinear • not linear (x) • not necessarily linear (o) • Why study nonlinear system ? • All physical systems are nonlinear in nature. • Nonlinearities may be introduced intentionally into a system in order to compensate for the effect of other undesirable nonlinearities, or to obtain better performance (on-off controller). • Linear system closed form solutionNonlinear system closed form solution X (Some predictions – qualitative analysis)
1. Phenomena of Nonlinear Dynamics • Linear vs. Nonlinear Input Output System state, Definitions : Linear : when the superposition holds Nonlinear : otherwise
Stability & Output of systems • Stability depends on the system’s parameter (linear) • Stability depends on the initial conditions, input signals as well as the system parameters (nonlinear). • Output of a linear system has the same frequency as the input although its amplitude and phase may differ. • Output of a nonlinear system usually contains additional frequency components and may, in fact, not contain the input frequency.
Sys. Sys. Sys. Superposition * Superposition = Is (1) linear ? + So is it linear? No, under zero initial conditions only.
Linearity What is the linearity when ? + A mnemonic rule: All functions in RHS of a differential equation are linear. System is linear atleast at zero input or zero initial condition Ex:
Time invariant vs. Time varying • Time invariant vs. Time varying • System (1) is time invariant parameters are constant - Linear time varying system • System (2) is time invariant no function has t as its argument. - Nonlinear time varying system
Autonomous & Non - Autonomous • Time invariant system are called autonomous and time varying are called non - autonomous. In this course, ‘autonomous’ is reserved for systems with no external input, i.e., • Thus autonomous are time invariant systems with no external input. This course will address nonlinear system, both time invariant and time varying, but mostly autonomous. Ex:
If det(A)0,(1)has a unique equilibrium point, (Linear System). Equilibrium Point • Equilibrium Point • We start with an autonomous system. Definition: is an equilibrium point (or a steady state, or a singular point) Nonlinear system ? × × × × × × multiple equilibrium points
Linear Autonomous Systems • What can a linear autonomous system do? where For 1-dim sys. For 2-dim sys.
Solution of Linear systems • For linear sys, the following facts are true • Solution always exists locally. • Solution always exists globally. • Solution is unique each initial condition produces a different trajectory. • Solution is continuously dependent on initial conditions for every finite t, • Equilibrium point is unique (when det A0).
Periodic Solution • If there is one periodic solution, there is an infinite setof periodic solutions. (There is no isolated closed solution.)Ex: ( many periodic solutions, w.r.t. I.C.)
Non - linear Autonomous System • What can a nonlinear autonomous system do ? • A solution may not exist, even locally. Basically everything. Here the solution is chattering, because Therefore, no differential function satisfying the equation exists.
Solutions • Solution may not exist globally. • Solution may not be unique. Assume finite escape time (= : linear system)
Equilibrium point • Equilibrium point doesn’t have to be unique. Ex: Ex:
Periodic Solutions • Nonlinear system may have isolated closed (periodic) solutions. Ex:
Isolated closed solution • Chaotic regimes non periodic, bounded behavior Isolated closed solution ( only one periodic solution.) Isolated attractive periodic solution Ex: ( lightly damped structure with large elastic deflections )
2. Second Order Systems • Isoclines called “vector field” Set of all trajectories on plane Phase portrait
Isocline(contd.) • Curve c is called an isocline: when a trajectory intersect the isocline, it has slope c, connecting isoclines, we can obtain a solution. Ex:
Linearization • Linearization A nonlinear system can be represented as a bunch of linear systems - each valid in a small neighborhood of using linearization. Specifically, assume that is continuously, differentiable, Take one of the equilibrium, say Introduce, where =0
Consider a sufficiently small ball around The linearization of at is defined by Linearization(contd.) Ex:
Linearization(contd.) Then the two linearizations are
Singular Points • Nature of singular points (a)
(b) Phase Portraits(contd.)
Phase Portraits(contd.) (c) Let stable focus unstablefocus center
Nonlinear system • Nonlinear system Assume that the nature of this singular point in the linear system is What is the nature of the singular point in the nonlinear system ? Ans) Same, except for center.Center for the linear system doesn’t mean center in the nonlinear system. Equilibrium of a nonlinear system such that the linearization has no eigenvalues on the imaginary axis is called hyperbolic. Thus, for hyperbolic equilibria, the nature is the same as the linearization.
