Some aspects of the asymptotics leading from gas-particles equations towards multiphase flows equations
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Publication:609629
DOI10.1007/s10955-010-0044-3zbMath1203.82080OpenAlexW2088927860MaRDI QIDQ609629
Laurent Desvillettes, Julien Mathiaud
Publication date: 1 December 2010
Published in: Journal of Statistical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10955-010-0044-3
Interacting particle systems in time-dependent statistical mechanics (82C22) Statistical mechanics of liquids (82D15) Statistical mechanics of gases (82D05) Vlasov equations (35Q83) Boltzmann equations (35Q20)
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Uses Software
Cites Work
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- Strong convergence towards homogeneous cooling states for dissipative Maxwell models
- Mathematics of granular materials
- Cooling process for inelastic Boltzmann equations for hard spheres. I: The Cauchy problem
- Cooling process for inelastic Boltzmann equations for hard spheres. II: Self-similar solutions and tail behavior
- A particle-fluid numerical model for liquid sprays
- On the fluid-dynamical approximation to the Boltzmann equation at the level of the Navier-Stokes equation
- Convergence to equilibrium in a system of reacting polymers
- The Boltzmann equation and its applications
- The mathematical theory of dilute gases
- On a model of Borgnakke-Larsen type leading to nonlinear energy laws at temperatures for polyatomic perfect gases
- Study of a secondary breakup model for sprays.
- On some properties of kinetic and hydrodynamic equations for inelastic interactions.
- A spatially homogeneous Boltzmann equation for elastic, inelastic and coalescing collisions
- A modeling of compressible droplets in a fluid
- Grain flow as a fluid-mechanical phenomenon
- NUMERICAL MODELING OF TWO-PHASE FLOWS USING THE TWO-FLUID TWO-PRESSURE APPROACH
- MODELLING OF OSCILLATIONS, BREAKUP AND COLLISIONS FOR DROPLETS: THE ESTABLISHMENT OF KERNELS FOR THE T.A.B. MODEL
- Hydrodynamic limit for the Vlasov-Navier-Stokes equations. Part I: Light particles regime.
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