Sedimentation of inertialess particles in Stokes flows

Sedimentation of random suspensions and the effect of hyperuniformity ⋮ Homogenization of a NonLinear Strongly Coupled Model of Magnetorheological Fluids ⋮ A virtual element generalization on polygonal meshes of the Scott-Vogelius finite element method for the 2-D Stokes problem ⋮ Large-time behavior of small-data solutions to the Vlasov-Navier-Stokes system on the whole space ⋮ Conforming virtual element approximations of the two-dimensional Stokes problem ⋮ Capillarity-driven Stokes flow: the one-phase problem as small viscosity limit ⋮ Non-existence of mean-field models for particle orientations in suspensions ⋮ Stress Blowup Analysis When a Suspending Rigid Particle Approaches the Boundary in Stokes Flow: 2-Dimensional Case ⋮ Dynamics of density patches in infinite Prandtl number convection ⋮ Derivation of the viscoelastic stress in Stokes flows induced by nonspherical Brownian rigid particles through homogenization ⋮ Effective viscosity of semi-dilute suspensions ⋮ Lagrangian solutions to the transport-Stokes system ⋮ The method of reflections, homogenization and screening for Poisson and Stokes equations in perforated domains ⋮ Analysis of the viscosity of dilute suspensions beyond Einstein's formula ⋮ A Local Version of Einstein's Formula for the Effective Viscosity of Suspensions ⋮ On the homogenization of the Stokes problem in a perforated domain ⋮ Classical and quantum mechanical models of many-particle systems. Abstracts from the workshop held November 29 -- December 5, 2020 (online meeting) ⋮ The influence of Einstein's effective viscosity on sedimentation at very small particle volume fraction ⋮ Concentration versus absorption for the Vlasov–Navier–Stokes system on bounded domains ⋮ The Inertialess Limit of Particle Sedimentation Modeled by the Vlasov--Stokes Equations ⋮ Methods of reflections: relations with Schwarz methods and classical stationary iterations, scalability and preconditioning. ⋮ On the method of reflections ⋮ Convergence of the method of reflections for particle suspensions in Stokes flows ⋮ Well-posedness of the Stokes-transport system in bounded domains and in the infinite strip ⋮ A model for suspension of clusters of particle pairs ⋮ Global gradient estimate for a divergence problem and its application to the homogenization of a magnetic suspension ⋮ Homogenisation for the Stokes equations in randomly perforated domains under almost minimal assumptions on the size of the holes

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• Global existence of solutions for the coupled Vlasov and Navier-Stokes equations.
• The mean-field limit for solid particles in a Navier-Stokes flow
• Existence of weak solutions for the motion of rigid bodies in a viscous fluid
• Global weak solutions for the two-dimensional motion of several rigid bodies in an incompressible viscous fluid
• On the motion of rigid bodies in a viscous incompressible fluid.
• The method of reflections, homogenization and screening for Poisson and Stokes equations in perforated domains
• Identification of the dilute regime in particle sedimentation
• Global existence and large time behaviour of solutions for the Vlasov-Stokes equations
• Homogenization of the Navier-Stokes equations in open sets perforated with tiny holes. I: Abstract framework, a volume distribution of holes
• Homogenization of the Navier-Stokes equations in open sets perforated with tiny holes. II: Non-critical sizes of the holes for a volume distribution and a surface distribution of holes
• Screening in interacting particle systems
• Coalescence, torus formation and breakup of sedimenting drops: experiments and computer simulations
• A Proof of Einstein's Effective Viscosity for a Dilute Suspension of Spheres
• An Introduction to the Mathematical Theory of the Navier-Stokes Equations
• A Physical Introduction to Suspension Dynamics
• Falling clouds of particles in viscous fluids
• Decay of velocity fluctuations in a stably stratified suspension
• Sedimentation in a dispersion with vertical inhomogeneities
• An Introduction to Fluid Dynamics
• The Inertialess Limit of Particle Sedimentation Modeled by the Vlasov--Stokes Equations
• HOMOGENIZATION IN COARSENING SYSTEMS I: DETERMINISTIC CASE
• Stability and Asymptotic Analysis of a Fluid-Particle Interaction Model
• Hydrodynamic limit for the Vlasov-Navier-Stokes equations. Part I: Light particles regime.
• Ostwald ripening: The screening length revisited