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Strange Attractor |
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Strange AttractorAn attractor in phase space, where the points never repeat themselves, and orbits never intersect, but they stay within the same region of phase space. Unlike limit cycles or point attractors, strange attractors are non-periodic, and generally have a fractal dimension. They are a picture of a non-linear, chaotic system. See: Attractor, Chaos, Limit Cycle, Point Attractor.Strange Attractor Similar MatchesPoint AttractorPoint AttractorIn non-linear dynamics, an attractor where all orbits in phase space are drawn to one point, or value. Essentially, any system which tends to a stable, single valued equilibrium will have a point attractor. A pendulum which is damped by friction will always stop, so its phase space will always be drawn to the point where velocity and position are equal to zero. See: Attractor, Phase Space. AttractorAttractorIn non-linear dynamic series, an attractor defines the equilibrium level of the system. See: Point Attractor, Limit Cycle, and Strange Attractor. |
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