Tikhonov's theorem (dynamical systems)

Error creating thumbnail: File missing

This article has multiple issues. Please help improve it or discuss these issues on the talk page. (Learn how and when to remove these messages) This article provides insufficient context for those unfamiliar with the subject. Please help improve the article by providing more context for the reader. (May 2025) (Learn how and when to remove this message) This article may be too technical for most readers to understand. Please help improve it to make it understandable to non-experts, without removing the technical details. (May 2025) (Learn how and when to remove this message) (Learn how and when to remove this message)

In applied mathematics, Tikhonov's theorem on dynamical systems is a result on stability of solutions of systems of differential equations. It has applications to chemical kinetics.^[1][2] The theorem is named after Andrey Nikolayevich Tikhonov.

Consider this system of differential equations:

${\displaystyle \begin{array}{cc}\frac{d𝐱}{dt}& =𝐟(𝐱,𝐳,t),\\ \mu \frac{d𝐳}{dt}& =𝐠(𝐱,𝐳,t).\end{array}}$

Taking the limit as ${\displaystyle \mu \to 0}$, this becomes the "degenerate system":

${\displaystyle \begin{array}{cc}\frac{d𝐱}{dt}& =𝐟(𝐱,𝐳,t),\\ 𝐳& =\phi (𝐱,t),\end{array}}$

where the second equation is the solution of the algebraic equation

${\displaystyle 𝐠(𝐱,𝐳,t)=0.}$

Note that there may be more than one such function ${\displaystyle \phi }$.

Tikhonov's theorem states that as ${\displaystyle \mu \to 0,}$ the solution of the system of two differential equations above approaches the solution of the degenerate system if ${\displaystyle 𝐳=\phi (𝐱,t)}$ is a stable root of the "adjoined system"

${\displaystyle \frac{d𝐳}{dt}=𝐠(𝐱,𝐳,t).}$