Login / Signup

Basin Entropy and Shearless Barrier Breakup in Open Non-Twist Hamiltonian Systems.

Leonardo C SouzaAmanda C MathiasPedro HaerterRicardo L Viana
Published in: Entropy (Basel, Switzerland) (2023)
We consider open non-twist Hamiltonian systems represented by an area-preserving two-dimensional map describing incompressible planar flows in the reference frame of a propagating wave, and possessing exits through which map orbits can escape. The corresponding escape basins have a fractal nature that can be revealed by the so-called basin entropy, a novel concept developed to quantify final-state uncertainty in dynamical systems. Since the map considered violates locally the twist condition, there is a shearless barrier that prevents global chaotic transport. In this paper, we show that it is possible to determine the shearless barrier breakup by considering the variation in the escape basin entropy with a tunable parameter.
Keyphrases
  • climate change
  • epithelial mesenchymal transition
  • minimally invasive
  • high density
  • water quality