Zubov's method

Zubov's method is a technique for computing the basin of attraction for a set of ordinary differential equations (a dynamical system). The domain of attraction is the set \{x:\, v(x)<1\}, where v(x) is the solution to a partial differential equation known as the Zubov equation. 'Zubov's method' can be used in a number of ways.

Zubov's theorem states that:

If x' = f(x), t \in \R is an ordinary differential equation in \R^n with f(0)=0, a set A containing 0 in its interior is the domain of attraction of zero if and only if there exist continuous functions v, h such that:
  • v(0) = h(0) = 0, 0 < v(x) < 1 for x \in A \setminus \{0\}, h > 0 on \R^n \setminus \{0\}
  • for every \gamma_2 > 0 there exist \gamma_1 > 0, \alpha_1 > 0 such that v(x) > \gamma_1, h(x) > \alpha_1 , if ||x||>\gamma_2
  • v(x_n) \rightarrow 1 for x_n \rightarrow \partial A or ||x_n|| \rightarrow \infty
  •  \nabla v(x) \cdot f(x) = -h(x)(1-v(x)) \sqrt{1+||f(x)||^2}

If f is continuously differentiable, then the differential equation has at most one continuously differentiable solution satisfying v(0) = 0.

References

Vladimir Ivanovich Zubov, Methods of A.M. Lyapunov and their application, Izdatel'stvo Leningradskogo Universiteta, 1961. (Translated by the United States Atomic Energy Commission, 1964.) ASIN B0007F2CDQ.

This article is issued from Wikipedia - version of the Saturday, October 06, 2012. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.