Attractor

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An '''attractor''' is a set to which a dynamical system evolves over time. This is can a point, a curve or manifold to which a system tends to move. If the manifold is chaotic, then it is a strange attractor. If it is a temporary attractor in the dynamical behaviour of a system, it can be called a transient attractor.

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An '''attractor''' is a set to which a dynamical system evolves over time. This is can a point, a curve or manifold to which a system tends to move. If the manifold is chaotic, then it is a strange attractor. If it is a temporary attractor in the dynamical behaviour of a system, it can be called a transient attractor. Seen from another point of view, an attractor is a set of points which ``attracts'' orbits and trajectories.

== Social Attractor ==

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No matter why the group members came together in the first place, in the end they discussed always something which they all had in common: for example the neighborhood, the company or the family.

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== Books ==

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* Steven Strogatz, Nonlinear dynamics and chaos : with applications to physics, biology, chemistry, and engineering, Perseus Books, 1994

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* Julien C. Sprott, [http://sprott.physics.wisc.edu/SA.HTM Strange Attractors: Creating Patterns in Chaos]

== Links ==

* Wikipedia entry for [http://en.wikipedia.org/wiki/Attractor attractor]

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-An '''attractor''' is a set to which a dynamical system evolves over time. This is can a point, a curve or manifold to which a system tends to move. If the manifold is chaotic, then it is a strange attractor. If it is a temporary attractor in the dynamical behaviour of a system, it can be called a transient attractor.
+An '''attractor''' is a set to which a dynamical system evolves over time. This is can a point, a curve or manifold to which a system tends to move. If the manifold is chaotic, then it is a strange attractor. If it is a temporary attractor in the dynamical behaviour of a system, it can be called a transient attractor. Seen from another point of view, an attractor is a set of points which ``attracts'' orbits and trajectories.
 == Social Attractor ==
@@ Line 12: / Line 12: @@
 No matter why the group members came together in the first place, in the end they discussed always something which they all had in common: for example the neighborhood, the company or the family.
+== Books ==
+* Steven Strogatz, Nonlinear dynamics and chaos : with applications to physics, biology, chemistry, and engineering, Perseus Books, 1994
+* Julien C. Sprott, [http://sprott.physics.wisc.edu/SA.HTM Strange Attractors: Creating Patterns in Chaos]
 == Links ==
 * Wikipedia entry for [http://en.wikipedia.org/wiki/Attractor attractor]