Homoclinic connection: Difference between revisions

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

Definition for maps

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

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

Then $V$ is called a homoclinic connection.

Definition for continuous flows

For continuous flows, the definition is essentially the same.

Comments

There is some variation in the definition across various publications;
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 $p$ both forwards and backwards in time.

@@ Line 4: / Line 4: @@
 Let <math>W^s(f,p)</math> and <math>W^u(f,p)</math> be the [[stable manifold]] and the [[unstable manifold]]
 of the fixed point <math>P</math>, respectively. Let <math>U</math> be an [[connected space |connected]] [[invariant manifold]] such that
-:<math> U\subseteq W^s(f,p)\cup W^u(f,p)</math>
+:<math> V\subseteq W^s(f,p)\cup W^u(f,p)</math>
-Then <math>U</math> is called a '''homoclinic connection'''.
+Then <math>V</math> is called a '''homoclinic connection'''.
 == Definition for continuous flows ==
 For continuous flows, the definition is essentially the same.