MG12 - Talk detail |
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Participant |
LEFRANC, Marc | |
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Institution |
CNRS/Université Lille 1, Laboratoire PhLAM - UFR de Physique, Cité Scientifique - Villeneuve d'Ascq - - France | |
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Session |
Talk |
Abstract |
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MGAT10 |
Characterizing chaos with orientation-preserving dynamical triangulations |
The determinism principle, which states that dynamical state completely determines future time evolution, is a keystone of nonlinear dynamics and chaos theory. Since it precludes that two state space trajectories intersect, it is a core ingredient of a topological analysis of chaos based on a knot-theoretic characterization of unstable periodic orbits embedded in a strange attractor. However, knot theory can be applied only to three-dimensional systems. Still, determinism applies in any dimension. We will describe an alternative framework in which this principle is enforced by constructing an orientation-preserving dynamics on triangulated surfaces and find that in three dimensions our approach numerically predicts the correct topological entropies for periodic orbits of the horseshoe map. |