Eran Igra
Published 2024-11-13, updated 2025-01-30Version 2
We prove that if a smooth vector field $F$ of $S^3$ generates a sufficiently complicated heteroclinic knot, the flow also generates infinitely many periodic orbits, which persist under smooth perturbations which preserve the heteroclinic knot. Consequentially, we then associate a Template with the flow dynamics - regardless of whether $F$ satisfies any hyperbolicity condition or not. In addition, inspired by the Thurston-Nielsen Classification Theorem, we also conclude topological criteria for the existence of chaotic dynamics for three-dimensional flows - which we apply to study both the R\"ossler and Lorenz attractors.
Bifurcations of periodic and chaotic attractors in pinball billiards with focusing boundaries
On the generalized dimensions of chaotic attractors
On Raw Coding of Chaotic Dynamics
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