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 Chemical kinetics, also known as reaction kinetics, is the branch of physical chemistry that is concerned with understanding the rates of chemical reactions. It is different from chemical thermodynamics, which deals with the direction in which a ...

. The theorem is named after

Andrey Nikolayevich Tikhonov Andrey Nikolayevich Tikhonov (; 17 October 1906 – 7 October 1993) was a leading Soviet Russian mathematician and geophysicist known for important contributions to topology, functional analysis, mathematical physics, and ill-posed problems ...

Statement

Consider this system of differential equations: :

\begin
\frac & = \mathbf(\mathbf,\mathbf,t), \\
\mu\frac & = \mathbf(\mathbf,\mathbf,t).
\end

Taking the limit as

\mu\to 0

, this becomes the "degenerate system": :

\begin
\frac & = \mathbf(\mathbf,\mathbf,t), \\
\mathbf & = \varphi(\mathbf,t),
\end

where the second equation is the solution of the algebraic equation :

\mathbf(\mathbf,\mathbf,t) = 0.

Note that there may be more than one such function

\varphi

. Tikhonov's theorem states that as

\mu\to 0,

the solution of the system of two differential equations above approaches the solution of the degenerate system if

\mathbf = \varphi(\mathbf,t)

is a stable root of the "adjoined system" :

\frac = \mathbf(\mathbf,\mathbf,t).

References

{{reflist Differential equations Perturbation theory Theorems in dynamical systems