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Estimating dimension of inertial manifold from unstable periodic orbits
classification
🌊 nlin.CD
keywords
dimensioninertialmanifoldorbitsperiodicsystemunstablechaotic
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We provide numerical evidence that a finite-dimensional inertial manifold on which the dynamics of a chaotic dissipative dynamical system lives can be constructed solely from the knowledge of a set of unstable periodic orbits. In particular, we determine the dimension of the inertial manifold for Kuramoto-Sivashinsky system, and find it to be equal to the `physical dimension' computed previously via the hyperbolicity properties of covariant Lyapunov vectors.
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