The pressure moments for two rigid spheres in low-Reynolds-number flow
From MaRDI portal
Publication:4294823
DOI10.1063/1.858795zbMath0797.76015OpenAlexW2015145365MaRDI QIDQ4294823
Jeffrey F. Morris, John F. Brady, David J. Jeffrey
Publication date: 20 October 1994
Published in: Physics of Fluids A: Fluid Dynamics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.858795
osmotic pressuremultipole expansionsresistance functionsdilute colloidal suspensionFaxén lawsheared cubic lattice
Lubrication theory (76D08) Multiphase and multicomponent flows (76T99) Stokes and related (Oseen, etc.) flows (76D07)
Related Items (17)
Parallel accelerated Stokesian dynamics with Brownian motion ⋮ The rheology and microstructure of concentrated non-colloidal suspensions of deformable capsules ⋮ A parallel implementation of the Stokesian dynamics method applied to the simulation of colloidal suspensions ⋮ A weakly nonlocal anisotropic fluid model for inhomogeneous Stokesian suspensions ⋮ A fictitious domain approach for the simulation of dense suspensions ⋮ Pressure-driven flow of suspensions: simulation and theory ⋮ Resistance functions for two spheres in axisymmetric flow-part. I: Stream function theory ⋮ Faxén formulas for particles of arbitrary shape and material composition ⋮ Normal stress and diffusion in a dilute suspension of hard spheres undergoing simple shear ⋮ Microstructure from simulated Brownian suspension flows at large shear rate ⋮ Using the suspension balance model in a finite-element flow solver ⋮ The collective dynamics of self-propelled particles ⋮ Lamb's solution and the stress moments for a sphere in Stokes flow ⋮ Spectral Ewald acceleration of Stokesian dynamics for polydisperse suspensions ⋮ Effect of confinement in wall-bounded non-colloidal suspensions ⋮ Haemorheology in dilute, semi-dilute and dense suspensions of red blood cells ⋮ Frame-invariant sub-grid corrections to the fictitious domain method for the simulation of particulate suspensions in nonlinear flows using OpenFOAM
Cites Work
- Calculation of the resistance and mobility functions for two unequal rigid spheres in low-Reynolds-number flow
- Kinetic theory for a monodisperse gas–solid suspension
- The resistance and mobility functions of two equal spheres in low-Reynolds-number flow
- Effective viscosity of a periodic suspension
- A new theory of the instability of a uniform fluidized bed
- Higher-order corrections to the axisymmetric interactions of nearly touching spheres
- The determination of the bulk stress in a suspension of spherical particles to order c 2
This page was built for publication: The pressure moments for two rigid spheres in low-Reynolds-number flow
