Rigorous study of short periodic orbits for the Lorenz system

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— The existence of short periodic orbits for the Lorenz system is studied rigorously. We describe a method for ﬁnding all short cycles embedded in a chaotic singular attractor (i.e. an attractor containing an equilibrium). The method uses an interval operator for proving the existence of periodic orbits in regions where it can be evaluated, and bounds for the return time in other regions. The six shortest periodic orbits for the Lorenz system are found.

Zbigniew Galias, Warwick Tucker

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Chaotic Singular Attractor | Hardware | ISCAS 2008 | Periodic Orbits | Short Periodic Orbits |

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Added	31 May 2010
Updated	31 May 2010
Type	Conference
Year	2008
Where	ISCAS
Authors	Zbigniew Galias, Warwick Tucker

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Rigorous study of short periodic orbits for the Lorenz system

Chaotic Singular Attractor | Hardware | ISCAS 2008 | Periodic Orbits | Short Periodic Orbits |

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