- Mathematical statement of Kalman's conjecture (Kalman problem)
- References
- Further reading
- External links
Kalman's conjecture or Kalman problem is a disproved conjecture on absolute stability of
nonlinear control system with one scalar nonlinearity, which belongs to the sector of linear stability. Kalman's conjecture is a strengthening of Aizerman's conjectureand is a special case of Markus–Yamabe conjecture. This conjecture was proven false but led to the (valid) sufficient criteria on absolute stability.
Mathematical statement of Kalman's conjecture (Kalman problem)
In 1957 R. E. Kalman in his paper
[1] stated the following:
If f(e) in Fig. 1 is replaced by constants K corresponding to all possible values of f'(e), and it is found that the closed-loop system is stable for all such K, then it intuitively clear that the system must be monostable; i.e., all transient solutions will converge to a unique, stable critical point.
Kalman's statement can be reformulated in the following conjecture:[2]
Consider a system with one scalar nonlinearity
where P is a constant n×n matrix, q, r are constant n-dimensional vectors, ∗ is an operation of transposition, f(e) is scalar function, and f(0) = 0. Suppose, f(e) is a differentiable function and the following condition
is valid. Then Kalman's conjecture is that the system is stable in the large (i.e. a unique stationary point is a global attractor) if all linear systems with f(e) = ke, k ∈ (k1, k2) are asymptotically stable.
In Aizerman's conjecture in place of the condition on the derivative of nonlinearity it is required that the nonlinearity itself belongs to the linear sector.
Kalman's conjecture is true for n ≤ 3 and for n > 3 there are effective methods for construction of counterexamples:[3][4] the nonlinearity derivative belongs to the sector of linear stability, and a unique stable equilibrium coexists with a stable periodic solution (hidden oscillation).
In discrete-time, the Kalman conjecture is only true for n=1, counterexamples for n ≥ 2 can be constructed.[5][6]
References
2. ^{{cite journal |author1=Leonov G.A. |author2=Kuznetsov N.V. | year = 2011 | title = Algorithms for Searching for Hidden Oscillations in the Aizerman and Kalman Problems | journal = Doklady Mathematics | volume = 84 | number = 1 | pages = 475–481| url = http://www.math.spbu.ru/user/nk/PDF/2011-DAN-Absolute-stability-Aizerman-problem-Kalman-conjecture.pdf | doi = 10.1134/S1064562411040120}}
3. ^{{cite journal |author1=Bragin V.O. |author2=Vagaitsev V.I. |author3=Kuznetsov N.V. |author4=Leonov G.A. | year = 2011 | title = Algorithms for Finding Hidden Oscillations in Nonlinear Systems. The Aizerman and Kalman Conjectures and Chua's Circuits | journal = Journal of Computer and Systems Sciences International | volume = 50 | number = 5 | pages = 511–543 | url = http://www.math.spbu.ru/user/nk/PDF/2011-TiSU-Hidden-oscillations-attractors-Aizerman-Kalman-conjectures.pdf | doi = 10.1134/S106423071104006X}}
4. ^{{cite journal |author1=Leonov G.A. |author2=Kuznetsov N.V. | year = 2013 | title = Hidden attractors in dynamical systems. From hidden oscillations in Hilbert-Kolmogorov, Aizerman, and Kalman problems to hidden chaotic attractor in Chua circuits | journal = International Journal of Bifurcation and Chaos | volume = 23 | issue = 1 | pages = art. no. 1330002| url = http://www.worldscientific.com/doi/pdf/10.1142/S0218127413300024|doi = 10.1142/S0218127413300024}}
5. ^{{cite journal |author1=Carrasco J. |author2=Heath W. P. |author3=de la Sen M. | year = 2015 | title = Second-order counterexample to the Kalman conjecture in discrete-time | journal = 2015 European Control Conference}}
6. ^{{cite journal |author1=Heath W. P. |author2=Carrasco J |author3=de la Sen M. | year = 2015 | title = Second-order counterexamples to the discrete-time Kalman conjecture | journal = Automatica | doi = 10.1016/j.automatica.2015.07.005}}
Further reading
- {{cite journal
|author1=Leonov G.A. |author2=Kuznetsov N.V. | year = 2011
| title = Analytical-numerical methods for investigation of hidden oscillations in nonlinear control systems
| journal = IFAC Proceedings Volumes (IFAC-PapersOnline)
| volume = 18
| number = 1
| pages = 2494–2505
| url = http://www.math.spbu.ru/user/nk/PDF/2011-IFAC-Hidden-oscillations-control-systems-Aizerman-problem-Kalman.pdf
| doi = 10.3182/20110828-6-IT-1002.03315}}
External links
- Analytical-numerical localization of hidden oscillation in counterexamples to Aizerman's and Kalman's conjectures
- Discrete-time counterexample in Maplecloud
- 2014 Michigan Wolverines football season
- 2014 Middle Tennessee Blue Raiders football
- 2014 Middle Tennessee Blue Raiders football season
- 2014 midterm elections
- 2014 mid-year rugby union internationals
- 2014 Milan-San Remo
- 2014 Milan - San Remo
- 2014 Mini Challenge UK
- 2014 Minnesota Golden Gophers football
- 2014 Minnesota Golden Gophers football season
- 2014 Minnesota Vikings
- 2014 Minnesota Vikings football team
- 2014 Mississippi State Bulldogs baseball team
- 2014 Mississippi State Bulldogs football
- 2014 Mississippi State Bulldogs football season
- 2014 Mississippi Valley State Delta Devils football
- 2014 Mississippi Valley State Delta Devils football season
- 2014 Missouri State Bears football
- 2014 Missouri State Bears football season
- 2014 Missouri Tigers baseball team
- 2014 Missouri Tigers football
- 2014 Missouri Tigers football season
- 2014 Missouri Valley Conference Men's Soccer Tournament
- 2014 Missouri Valley Conference men's soccer tournament
- 2014 Missouri Voodoo season