Establishes quantitative exponential mixing for the randomized Chirikov standard map on T^2 under large kicking strengths via a new criterion for incompressible random dynamical systems.
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A Hamiltonian reduced-order model optimizes 2D incompressible mixing by maximizing interface length, yielding near-exponential stretching and faster H^{-1} mix-norm decay than stationary or Eulerian baselines.
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Quantitative exponential mixing for the randomized Chirikov standard map
Establishes quantitative exponential mixing for the randomized Chirikov standard map on T^2 under large kicking strengths via a new criterion for incompressible random dynamical systems.
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Hamiltonian Interface Dynamics for Reduced-Order Optimization of Incompressible Mixing
A Hamiltonian reduced-order model optimizes 2D incompressible mixing by maximizing interface length, yielding near-exponential stretching and faster H^{-1} mix-norm decay than stationary or Eulerian baselines.