Lyapunov stability
Various types of stability may be discussed for the solutions of differential equations describing dynamical systems. The most important type is that concerning the stability of solutions near to a point of equilibrium. This may be discussed by the theory of Lyapunov. In simple terms, if the solutions that start out near an equilibrium point stay near forever, then is Lyapunov stable. More strongly, if is Lyapunov stable and all solutions that start out near converge to , then is asymptotically stable. The notion of exponential stability guarantees a minimal rate of decay, i.e., an estimate of how quickly the solutions converge. The idea of Lyapunov stability can be extended to infinite-dimensional manifolds, where it is known as structural stability, which concerns the behavior of different but "nearby" solutions to differential equations. Input-to-state stability (ISS) applies Lyapunov notions to systems with inputs.
History
Lyapunov stability is named after Aleksandr Lyapunov, a Russian mathematician who published his book The General Problem of Stability of Motion in 1892.[1] Lyapunov was the first to consider the modifications necessary in nonlinear systems to the linear theory of stability based on linearizing near a point of equilibrium. His work, initially published in Russian and then translated to French, received little attention for many years. Interest in it started suddenly during the Cold War period when the so-called "Second Method of Lyapunov" (see below) was found to be applicable to the stability of aerospace guidance systems which typically contain strong nonlinearities not treatable by other methods. A large number of publications appeared then and since in the control and systems literature.[2][3][4][5][6] More recently the concept of the Lyapunov exponent (related to Lyapunov's First Method of discussing stability) has received wide interest in connection with chaos theory. Lyapunov stability methods have also been applied to finding equilibrium solutions in traffic assignment problems.[7]
Definition for continuous-time systems
Consider an autonomous nonlinear dynamical system
- ,
where denotes the system state vector, an open set containing the origin, and continuous on . Suppose has an equilibrium at so that then
- This equilibrium is said to be Lyapunov stable, if, for every , there exists a such that, if , then for every we have .
- The equilibrium of the above system is said to be asymptotically stable if it is Lyapunov stable and there exists such that if , then .
- The equilibrium of the above system is said to be exponentially stable if it is asymptotically stable and there exist such that if , then , for all .
Conceptually, the meanings of the above terms are the following:
- Lyapunov stability of an equilibrium means that solutions starting "close enough" to the equilibrium (within a distance from it) remain "close enough" forever (within a distance from it). Note that this must be true for any that one may want to choose.
- Asymptotic stability means that solutions that start close enough not only remain close enough but also eventually converge to the equilibrium.
- Exponential stability means that solutions not only converge, but in fact converge faster than or at least as fast as a particular known rate .
The trajectory x is (locally) attractive if
(where y(t) denotes the system output) for for all trajectories that start close enough, and globally attractive if this property holds for all trajectories.
That is, if x belongs to the interior of its stable manifold, it is asymptotically stable if it is both attractive and stable. (There are examples showing that attractivity does not imply asymptotic stability. Such examples are easy to create using homoclinic connections.)
If the Jacobian of the dynamical system at an equilibrium happens to be a stability matrix (i.e., if the real part of each eigenvalue is strictly negative), then the equilibrium is asymptotically stable.
Lyapunov's second method for stability
Lyapunov, in his original 1892 work, proposed two methods for demonstrating stability.[1] The first method developed the solution in a series which was then proved convergent within limits. The second method, which is now referred to as the Lyapunov stability criterion, makes use of a Lyapunov function V(x) which has an analogy to the potential function of classical dynamics. It is introduced as follows for a system having a point of equilibrium at x=0. Consider a function such that
- if and only if
- if and only if
- for all values of (negative semidefinite). Note: for asymptotic stability, for is required (negative definite).
Then V(x) is called a Lyapunov function candidate and the system is stable in the sense of Lyapunov (Note that is required; otherwise for example would "prove" that is locally stable). An additional condition called "properness" or "radial unboundedness" is required in order to conclude global stability. Global asymptotic stability (GAS) follows similarly.
It is easier to visualize this method of analysis by thinking of a physical system (e.g. vibrating spring and mass) and considering the energy of such a system. If the system loses energy over time and the energy is never restored then eventually the system must grind to a stop and reach some final resting state. This final state is called the attractor. However, finding a function that gives the precise energy of a physical system can be difficult, and for abstract mathematical systems, economic systems or biological systems, the concept of energy may not be applicable.
Lyapunov's realization was that stability can be proven without requiring knowledge of the true physical energy, provided a Lyapunov function can be found to satisfy the above constraints.
Definition for discrete-time systems
The definition for discrete-time systems is almost identical to that for continuous-time systems. The definition below provides this, using an alternate language commonly used in more mathematical texts.
Let (X, d) be a metric space and f : X → X a continuous function. A point x in X is said to be Lyapunov stable, if,
We say that x is asymptotically stable if it belongs to the interior of its stable set, i.e. if,
Stability for linear state space models
A linear state space model
- ,
where is a finite matrix, is asymptotically stable (in fact, exponentially stable) if all real parts of the eigenvalues of are negative. This condition is equivalent to the following one:
is negative definite for some positive definite matrix . (The relevant Lyapunov function is .)
Correspondingly, a time-discrete linear state space model
is asymptotically stable (in fact, exponentially stable) if all the eigenvalues of have a modulus smaller than one.
This latter condition has been generalized to switched systems: a linear switched discrete time system (ruled by a set of matrices )
is asymptotically stable (in fact, exponentially stable) if the joint spectral radius of the set is smaller than one.
Stability for systems with inputs
A system with inputs (or controls) has the form
where the (generally time-dependent) input u(t) may be viewed as a control, external input, stimulus, disturbance, or forcing function. The study of such systems is the subject of control theory and applied in control engineering. For systems with inputs, one must quantify the effect of inputs on the stability of the system. The main two approaches to this analysis are BIBO stability (for linear systems) and input-to-state (ISS) stability (for nonlinear systems)
Example
Consider an equation, where compared to the Van der Pol oscillator equation the friction term is changed:
The equilibrium is at :
Here is a good example of an unsuccessful try to find a Lyapunov function that proves stability:
Let
so that the corresponding system is
Let us choose as a Lyapunov function
which is clearly positive definite. Its derivative is
It seems that if the parameter is positive, stability is asymptotic for But this is wrong, since does not depend on , and will be 0 everywhere on the axis. The system is Lyapunov stable.
Barbalat's lemma and stability of time-varying systems
Assume that f is function of time only.
- Having does not imply that has a limit at . For example, .
- Having approaching a limit as does not imply that . For example, .
- Having lower bounded and decreasing () implies it converges to a limit. But it does not say whether or not as .
Barbalat's Lemma says:
- If has a finite limit as and if is uniformly continuous (or is bounded), then as .
Usually, it is difficult to analyze the asymptotic stability of time-varying systems because it is very difficult to find Lyapunov functions with a negative definite derivative.
We know that in case of autonomous (time-invariant) systems, if is negative semi-definite (NSD), then also, it is possible to know the asymptotic behaviour by invoking invariant-set theorems. However, this flexibility is not available for time-varying systems. This is where "Barbalat's lemma" comes into picture. It says:
- IF satisfies following conditions:
- is lower bounded
- is negative semi-definite (NSD)
- is uniformly continuous in time (satisfied if is finite)
- then as .
The following example is taken from page 125 of Slotine and Li's book Applied Nonlinear Control.
Consider a non-autonomous system
This is non-autonomous because the input is a function of time. Assume that the input is bounded.
Taking gives
This says that by first two conditions and hence and are bounded. But it does not say anything about the convergence of to zero. Moreover, the invariant set theorem cannot be applied, because the dynamics is non-autonomous.
Using Barbalat's lemma:
- .
This is bounded because , and are bounded. This implies as and hence . This proves that the error converges.
See also
References
- 1 2 Lyapunov A. M. The General Problem of the Stability of Motion (In Russian), Doctoral dissertation, Univ. Kharkov 1892 English translations: (1) Stability of Motion, Academic Press, New-York & London, 1966 (2) The General Problem of the Stability of Motion, (A. T. Fuller trans.) Taylor & Francis, London 1992. Included is a biography by Smirnov and an extensive bibliography of Lyapunov's work.
- ↑ Letov, A. M. (1955). Устойчивость нелинейных регулируемых систем [Stability of Nonlinear Control Systems] (in Russian). Moscow: Gostekhizdat. English tr. Princeton 1961
- ↑ Kalman, R. E.; Bertram, J. F (1960). "Control System Analysis and Design via the Second Method of Lyapunov". J. Basic Engrg 88: 371; 394.
- ↑ LaSalle, J. P.; Lefschetz, S. (1961). Stability by Lyapunov's Second Method with Applications. New York: Academic Press.
- ↑ Parks, P. C. (1962). "Liapunov's method in automatic control theory". Control. I Nov 1962 II Dec 1962.
- ↑ Kalman, R. E. (1963). "Lyapunov functions for the problem of Lur'e in automatic control". Proc Natl Acad Sci USA 49 (2): 201–205. PMC 299777. PMID 16591048.
- ↑ Smith, M. J.; Wisten, M. B. (1995). "A continuous day-to-day traffic assignment model and the existence of a continuous dynamic user equilibrium". Annals of Operations Research 60 (1): 59–79. doi:10.1007/BF02031940.
Further reading
- Gandolfo, Giancarlo (1996). Economic Dynamics (Third ed.). Berlin: Springer. pp. 407–428. ISBN 3-540-60988-1.
- Bhatia, Nam Parshad; Szegő, Giorgio P. (2002). Stability theory of dynamical systems. Springer. ISBN 978-3-540-42748-3.
- Parks, P. C. (1992). "A. M. Lyapunov's stability theory—100 years on". IMA Journal of Mathematical Control & Information 9 (4): 275–303. doi:10.1093/imamci/9.4.275.
- Slotine, Jean-Jacques E.; Weiping Li (1991). Applied Nonlinear Control. NJ: Prentice Hall.
- Teschl, G. (2012). Ordinary Differential Equations and Dynamical Systems. Providence: American Mathematical Society. ISBN 978-0-8218-8328-0.
- Wiggins, S. (2003). Introduction to Applied Nonlinear Dynamical Systems and Chaos (2 ed.). New York: Springer Verlag. ISBN 0-387-00177-8.
External links
- http://www.mne.ksu.edu/research/laboratories/non-linear-controls-lab (login required)
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