Markus–Yamabe conjecture

In

map on an ${\displaystyle n}$-dimensional is everywhere Hurwitz, then the fixed point is globally stable.

The conjecture is true for the two-dimensional case. However, counterexamples have been constructed in higher dimensions. Hence, in the two-dimensional case only, it can also be referred to as the Markus–Yamabe theorem.

Related mathematical results concerning global asymptotic stability, which are applicable in dimensions higher than two, include various autonomous convergence theorems. Analog of the conjecture for nonlinear control system with scalar nonlinearity is known as Kalman's conjecture.

Mathematical statement of conjecture

Let ${\displaystyle f:\mathbb {R} ^{n}\rightarrow \mathbb {R} ^{n}}$ be a ${\displaystyle C^{1}}$ map with ${\displaystyle f(0)=0}$ and Jacobian ${\displaystyle Df(x)}$ which is Hurwitz stable for every ${\displaystyle x\in \mathbb {R} ^{n}}$.

Then ${\displaystyle 0}$ is a global attractor of the dynamical system ${\displaystyle {\dot {x}}=f(x)}$.

The conjecture is true for ${\displaystyle n=2}$ and false in general for ${\displaystyle n>2}$.

References

• Markus, Lawrence; Yamabe, Hidehiko (1960). "Global Stability Criteria for Differential Systems". Osaka Mathematical Journal. 12 (2): 305–317.
• Meisters, Gary (1996). "A Biography of the Markus–Yamabe Conjecture" (PDF). Retrieved October 20, 2023.
• Gutierrez, Carlos (1995). "A solution to the bidimensional Global Asymptotic Stability Conjecture". Annales de l'Institut Henri Poincaré C. 12 (6): 627–671.
  doi:10.1016/S0294-1449(16)30147-0
  .
• Feßler, Robert (1995). "A proof of the two-dimensional Markus–Yamabe stability conjecture and a generalisation".
  doi:10.4064/ap-62-1-45-74
  .
• Cima, Anna; van den Essen, Arno; Gasull, Armengol; Hubbers, Engelbert; Mañosas, Francesc (1997). "A Polynomial Counterexample to the Markus–Yamabe Conjecture".
  hdl:2066/112453
  .
• Bernat, Josep; Llibre, Jaume (1996). "Counterexample to Kalman and Markus–Yamabe Conjectures in dimension larger than 3". Dynamics of Continuous, Discrete & Impulsive Systems. 2 (3): 337–379.
• Bragin, V. O.; Vagaitsev, V.I.; Kuznetsov, N. V.; Leonov, G.A. (2011). "Algorithms for Finding Hidden Oscillations in Nonlinear Systems. The Aizerman and Kalman Conjectures and Chua's Circuits". Journal of Computer and Systems Sciences International. 50 (5): 511–543.
  S2CID 21657305
  .
• Leonov, G. A.; Kuznetsov, N. V. (2013). "Hidden attractors in dynamical systems. From hidden oscillations in Hilbert-Kolmogorov, Aizerman, and Kalman problems to hidden chaotic attractor in Chua circuits". International Journal of Bifurcation and Chaos. 23 (1): 1330002–1330219.
  doi:10.1142/S0218127413300024
  .