Lyapunov–Schmidt reduction

In mathematics, the Lyapunov–Schmidt reduction or Lyapunov–Schmidt construction is used to study solutions to nonlinear equations in the case when the implicit function theorem does not work. It permits the reduction of infinite-dimensional equations in Banach spaces to finite-dimensional equations. It is named after Aleksandr Lyapunov and Erhard Schmidt.

Let

${\displaystyle f(x,\lambda )=0}$

be the given nonlinear equation, ${\displaystyle X,\mathrm{\Lambda },}$ and ${\displaystyle Y}$ are Banach spaces (${\displaystyle \mathrm{\Lambda }}$ is the parameter space). ${\displaystyle f(x,\lambda )}$ is the ${\displaystyle C^p}$-map from a neighborhood of some point ${\displaystyle (x_0,{\lambda }_0)\in X\times \mathrm{\Lambda }}$ to ${\displaystyle Y}$ and the equation is satisfied at this point

${\displaystyle f(x_0,{\lambda }_0)=0.}$

For the case when the linear operator ${\displaystyle f_x(x,\lambda )}$ is invertible, the implicit function theorem assures that there exists a solution ${\displaystyle x(\lambda )}$ satisfying the equation ${\displaystyle f(x(\lambda ),\lambda )=0}$ at least locally close to ${\displaystyle {\lambda }_0}$.

In the opposite case, when the linear operator ${\displaystyle f_x(x,\lambda )}$ is non-invertible, the Lyapunov–Schmidt reduction can be applied in the following way.

One assumes that the operator ${\displaystyle f_x(x,\lambda )}$ is a Fredholm operator.

${\displaystyle \ker f_x(x_0,{\lambda }_0)=X_1}$ and ${\displaystyle X_1}$ has finite dimension.

The range of this operator ${\displaystyle \mathrm{r}\mathrm{a}\mathrm{n}{f}_x(x_0,{\lambda }_0)=Y_1}$ has finite co-dimension and is a closed subspace in ${\displaystyle Y}$.

Without loss of generality, one can assume that ${\displaystyle (x_0,{\lambda }_0)=(0,0).}$

Let us split ${\displaystyle Y}$ into the direct product ${\displaystyle Y=Y_1\oplus Y_2}$, where ${\displaystyle \dim Y_2<\mathrm{\infty }}$.

Let ${\displaystyle Q}$ be the projection operator onto ${\displaystyle Y_1}$.

Consider also the direct product ${\displaystyle X=X_1\oplus X_2}$.

Applying the operators ${\displaystyle Q}$ and ${\displaystyle I-Q}$ to the original equation, one obtains the equivalent system

${\displaystyle Qf(x,\lambda )=0}$

${\displaystyle (I-Q)f(x,\lambda )=0}$

Let ${\displaystyle x_1\in X_1}$ and ${\displaystyle x_2\in X_2}$, then the first equation

${\displaystyle Qf(x_1+x_2,\lambda )=0}$

can be solved with respect to ${\displaystyle x_2}$ by applying the implicit function theorem to the operator

${\displaystyle Qf(x_1+x_2,\lambda ):X_2\times (X_1\times \mathrm{\Lambda })\to Y_1}$

(now the conditions of the implicit function theorem are fulfilled).

Thus, there exists a unique solution ${\displaystyle x_2(x_1,\lambda )}$ satisfying

${\displaystyle Qf(x_1+x_2(x_1,\lambda ),\lambda )=0.}$

Now substituting ${\displaystyle x_2(x_1,\lambda )}$ into the second equation, one obtains the final finite-dimensional equation

${\displaystyle (I-Q)f(x_1+x_2(x_1,\lambda ),\lambda )=0.}$

Indeed, the last equation is now finite-dimensional, since the range of ${\displaystyle (I-Q)}$ is finite-dimensional. This equation is now to be solved with respect to ${\displaystyle x_1}$, which is finite-dimensional, and parameters :${\displaystyle \lambda }$

Lyapunov–Schmidt reduction has been used in economics, natural sciences, and engineering^[1] often in combination with bifurcation theory, perturbation theory, and regularization.^[1][2][3] LS reduction is often used to rigorously regularize partial differential equation models in chemical engineering resulting in models that are easier to simulate numerically but still retain all the parameters of the original model.^[3][4][5]

• Louis Nirenberg, Topics in nonlinear functional analysis, New York Univ. Lecture Notes, 1974.
• Aleksandr Lyapunov, Sur les figures d’équilibre peu différents des ellipsoides d’une masse liquide homogène douée d’un mouvement de rotation, Zap. Akad. Nauk St. Petersburg (1906), 1–225.
• Aleksandr Lyapunov, Problème général de la stabilité du mouvement, Ann. Fac. Sci. Toulouse 2 (1907), 203–474.
• Erhard Schmidt, Zur Theory der linearen und nichtlinearen Integralgleichungen, 3 Teil, Math. Annalen 65 (1908), 370–399.

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