Transport and deposition of weakly inertial particles in closed channel flows at low Reynolds number
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Publication:1672212
DOI10.1016/J.EUROMECHFLU.2017.05.004zbMath1408.76531OpenAlexW2621182748MaRDI QIDQ1672212
Luc Scholtès, Constantin Oltean, Michel Buès, Ahmad Hajjar
Publication date: 7 September 2018
Published in: European Journal of Mechanics. B. Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.euromechflu.2017.05.004
Cites Work
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- Where do inertial particles go in fluid flows?
- The influence of Basset force on particle dynamics in two-dimensional flows
- Lattice Boltzmann method simulations of Stokes number effects on particle trajectories in a wall-bounded flow
- Inertial focusing of small particles in wavy channels: asymptotic analysis at weak particle inertia
- Equation of motion for a small rigid sphere in a nonuniform flow
- Fractal clustering of inertial particles in random flows
- The force exerted on a body in inviscid unsteady non-uniform rotational flow
- Inertial migration of a sphere in Poiseuille flow
- The motion of rigid particles in a shear flow at low Reynolds number
- The inertial lift on a spherical particle in a plane Poiseuille flow at large channel Reynolds number
- P<scp>ARTICLE</scp>-T<scp>URBULENCE</scp> I<scp>NTERACTIONS IN</scp> A<scp>TMOSPHERIC</scp> C<scp>LOUDS</scp>
- Inertial migration of rigid spherical particles in Poiseuille flow
- Inertial migration of rigid spheres in two-dimensional unidirectional flows
- Inertial particle trapping in an open vortical flow
- Clustering criterion for inertial particles in two-dimensional time-periodic and three-dimensional steady flows
- Preferential concentration of particles by turbulence
- Direct simulation of initial value problems for the motion of solid bodies in a Newtonian fluid. Part 2. Couette and Poiseuille flows
- Migration of a sphere in tube flow
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