Non-linear control

Non-linear control is a sub-division of control engineering which deals with the control of non-linear systems. Non-linear systems are those systems whose input-output behaviour is very much unpredictable. For linear systems, we have a lot of well-established control techniques like root-locus, Bode plot, Nyquist criterion, state-feedback, pole-placement etc.

Properties of non-linear systems

• They do not follow the principle of superposition (linearity and homogeneity).
• They may have multiple isolated equilibrium points.
• They exhibit properties like limit-cycle, bifurcation, chaos.
• For a sinusoidal input, the output signal may contain many harmonics and sub-harmonics with various amplitudes and phase differences. While for a linear system, we know that for u= A sin(ωt), output y = B sin(ωt+ φ).

Analysis and control of non-linear systems

• Describing function method
• Phase plane method
• Lyapunov based methods
• Input-output stability
• Feedback linearization
• Back-stepping
• Sliding mode control
• Singular perturbation

The Lur'e problem

In this section, we will study the stability of an important class of control systems namely feedback systems whose forward path contains a linear time-invariant subsystem and whose feedback path contains a memory-less and possibly time-varying non-linearity. This class of problem is named for A. I. Lur'e. :Lure Problem Block Diagram The linear part is characterized by four matrices (A,B,C,D). The non-linear part is Φ ∈ [a,b], aAbsolute stability problem Given that # (A,B) is controllable and (C,A) is observable # two real numbers a,b with a

The Circle criterion

The Popov criterion.

Popov criterion

The class of systems studied by Popov is described by : $u\; =\; -\backslash \backslash phi\; (y)\; \backslash \backslash quad\; (2)$ where x ∈ Rⁿ, ξ,u,y are scalars and A,b,c,d have commensurate dimensions. The non-linear element Φ: R → R is a time-invariant nonlinearity belonging to open sector (0, ∞). This means that Φ(0) = 0, y Φ(y) > 0, ∀ y ≠ 0; (3) The transfer function from u to y is given by
:$h(s)\; =\; \backslash \backslash frac\{d\}\{s\}\; +\; c(sI-A)^\{-1\}b\; \backslash \backslash quad\; \backslash \backslash quad\; (4)$ Things to be noted

• Popov criterion is applicable only to autonomous systems.
• The system studied by Popov has a pole at the origin and there is no throughput from input to output.
• Non-linearity Φ belongs to a open sector.

Theorem: Consider the system (1) and (2) and suppose # A is Hurwitz #(A,b) is controllable #(A,c) is observable #d>0 and # Φ ∈ (0,∞) then the above system is globally asymptotically stable if there exists a number r>0 such that
inf_{ω ∈ R} Re[(1+jωr)h(jω)] > 0

References

• A. I. Lur'e and V. N. Postnikov, "On the theory of stability of control systems," Applied mathematics and mechanics, 8(3), 1944, (in Russian).
• M. Vidyasagar, Nonlinear Systems Analysis, second edition, Prentice Hall, Englewood Cliffs, New Jersey 07632.

See also

• Phase-locked loop

Category:Non-linear systems Category:Control theory

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