In subcritical and critical scalings, Navier-Stokes solutions in randomly perforated domains converge to Euler or Euler-Brinkman equations under small local Reynolds number.
Particle approximation of Vlasov equations with singular forces: Propagation of Chaos
2 Pith papers cite this work. Polarity classification is still indexing.
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Calculates time-dependent parameters of chaos propagation velocity in classical and non-local non-stationary heat transfer models using Lyapunov exponent regions.
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Homogenization of the Navier-Stokes equations in a randomly perforated domain in the inviscid limit
In subcritical and critical scalings, Navier-Stokes solutions in randomly perforated domains converge to Euler or Euler-Brinkman equations under small local Reynolds number.
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The velocity of dynamical chaos during propagation of the positive Lyapunov exponents region under non-local conditions
Calculates time-dependent parameters of chaos propagation velocity in classical and non-local non-stationary heat transfer models using Lyapunov exponent regions.