Invariant manifold

In dynamical systems, a branch of mathematics, an invariant manifold is a topological manifold that is invariant under the action of the dynamical system.^[1] Examples include the slow manifold, center manifold, stable manifold, unstable manifold, subcenter manifold and inertial manifold.

Typically, although by no means always, invariant manifolds are constructed as a 'perturbation' of an invariant subspace about an equilibrium. In dissipative systems, an invariant manifold based upon the gravest, longest lasting modes forms an effective low-dimensional, reduced, model of the dynamics. ^[2]

Definition

Consider the differential equation ${\displaystyle dx/dt=f(x),\ x\in \mathbb {R} ^{n},}$ with flow ${\displaystyle x(t)=\phi _{t}(x_{0})}$ being the solution of the differential equation with ${\displaystyle x(0)=x_{0}}$. A set ${\displaystyle S\subset \mathbb {R} ^{n}}$ is called an invariant set for the differential equation if, for each ${\displaystyle x_{0}\in S}$, the solution ${\displaystyle t\mapsto \phi _{t}(x_{0})}$, defined on its maximal interval of existence, has its image in ${\displaystyle S}$. Alternatively, the orbit passing through each ${\displaystyle x_{0}\in S}$ lies in ${\displaystyle S}$. In addition, ${\displaystyle S}$ is called an invariant manifold if ${\displaystyle S}$ is a manifold. ^[3]

Examples

Simple 2D dynamical system

For any fixed parameter ${\displaystyle a}$, consider the variables ${\displaystyle x(t),y(t)}$ governed by the pair of coupled differential equations

${\displaystyle dx/dt=ax-xy\quad {\text{and}}\quad dy/dt=-y+x^{2}-2y^{2}.}$

The origin is an equilibrium. This system has two invariant manifolds of interest through the origin.

• The vertical line ${\displaystyle x=0}$ is invariant as when ${\displaystyle x=0}$ the ${\displaystyle x}$-equation becomes ${\displaystyle dx/dt=0}$ which ensures ${\displaystyle x}$ remains zero. This invariant manifold, ${\displaystyle x=0}$, is a stable manifold of the origin (when ${\displaystyle a\geq 0}$) as all initial conditions ${\displaystyle x(0)=0,\ y(0)>-1/2}$ lead to solutions asymptotically approaching the origin.
• The parabola ${\displaystyle y=x^{2}/(1+2a)}$ is invariant for all parameter ${\displaystyle a}$. One can see this invariance by considering the time derivative ${\displaystyle d/dt[y-x^{2}/(1+2a)]}$ and finding it is zero on ${\displaystyle y=x^{2}/(1+2a)}$ as required for an invariant manifold. For ${\displaystyle a>0}$ this parabola is the unstable manifold of the origin. For ${\displaystyle a=0}$ this parabola is a center manifold, more precisely a slow manifold, of the origin.
• For ${\displaystyle a<0}$ there is only an invariant stable manifold about the origin, the stable manifold including all ${\displaystyle (x,y),\ y>-1/2}$.

See also

• Hyperbolic set

References

1. Hirsh M.W., Pugh C.C., Shub M., Invariant Manifolds, Lect. Notes. Math., 583, Springer, Berlin — Heidelberg, 1977
2. A. J. Roberts. The utility of an invariant manifold description of the evolution of a dynamical system. SIAM J. Math. Anal., 20:1447–1458, 1989. http://locus.siam.org/SIMA/volume-20/art_0520094.html
3. C. Chicone. Ordinary Differential Equations with Applications, volume 34 of Texts in Applied Mathematics. Springer, 2006, p.34