Homoclinic orbit
In mathematics, a homoclinic orbit is a trajectory of a flow of a dynamical system which joins a saddle equilibrium point to itself. More precisely, a homoclinic orbit lies in the intersection of the stable manifold and the unstable manifold of an equilibrium. Consider the continuous dynamical system described by the ODE Suppose there is an equilibrium at , then a solution is a homoclinic orbit if
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Homoclinic orbit
In mathematics, a homoclinic orbit is a trajectory of a flow of a dynamical system which joins a saddle equilibrium point to itself. More precisely, a homoclinic orbit lies in the intersection of the stable manifold and the unstable manifold of an equilibrium. Consider the continuous dynamical system described by the ODE Suppose there is an equilibrium at , then a solution is a homoclinic orbit if
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Ein homokliner Orbit ist in de ...... ppelt asymptotische Lösungen).
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In matematica, una orbita omoc ...... fisso (o periodico) tale che:
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In mathematics, a homoclinic o ...... linic orbit is called twisted.
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数学において、ホモクリニック軌道(homoclinic or ...... と不安定多様体の不動点と周期点を用いて定義することができる。
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Ein homokliner Orbit ist in de ...... its sich für ) für . und gegen
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In matematica, una orbita omoc ...... ziale ordinaria: , si dice che
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In mathematics, a homoclinic o ...... ution is a homoclinic orbit if
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数学において、ホモクリニック軌道(homoclinic or ...... と不安定多様体の不動点と周期点を用いて定義することができる。
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Homoclinic orbit
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Homokliner Orbit
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Orbita omoclina
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ホモクリニック軌道
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