Homoclinic connection: Difference between revisions

In dynamical systems, a branch of mathematics, a structure formed from the stable manifold and unstable manifold of a fixed point.

Homoclinic, Heteroclinic Connections and Intersections.

Definition for maps

Let ${\displaystyle f:M\to M}$ be a map defined on a manifold ${\displaystyle M}$, with a fixed point ${\displaystyle p}$. Let ${\displaystyle W^{s}(f,p)}$ and ${\displaystyle W^{u}(f,p)}$ be the stable manifold and the unstable manifold of the fixed point ${\displaystyle P}$, respectively. Let ${\displaystyle V}$ be an connected invariant manifold such that

${\displaystyle V\subseteq W^{s}(f,p)\cup W^{u}(f,p)}$

Then ${\displaystyle V}$ is called a homoclinic connection.

Heteroclinic connection

It is a similar notion, but it refers to two fixed points, ${\displaystyle p}$ and ${\displaystyle q}$. The condition satisfied by ${\displaystyle V}$ is replaced with:

${\displaystyle V\subseteq W^{s}(f,p)\cup W^{u}(f,q)}$

This notion is not symmetric with respect to ${\displaystyle p}$ and ${\displaystyle q}$.

Definition for continuous flows

For continuous flows, the definition is essentially the same.

Comments

1. There is some variation in the definition across various publications;
2. Historically, the first case considered was that of a continuous flow on the plane, induced by an ordinary differential equation. In this case, a homoclinic connection is a single trajectory that converges to the fixed point ${\displaystyle p}$ both forwards and backwards in time.

Significance

When a dynamical system is perturbed, a homoclinic connection splits. It becomes a disconnected invariant set. Near it, there will be a chaotic set called Smale's horseshoe. Thus, the existence of a homoclinic connection is thus considered as potentially leading to chaos.