Binary collision of drops in simple shear flow at finite Reynolds numbers: geometry and viscosity ratio effects
From MaRDI portal
Publication:634304
DOI10.1016/J.ADVENGSOFT.2011.04.010zbMath1356.76375OpenAlexW1969603196MaRDI QIDQ634304
Publication date: 2 August 2011
Published in: Advances in Engineering Software (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.advengsoft.2011.04.010
Finite difference methods applied to problems in fluid mechanics (76M20) Capillarity (surface tension) for incompressible viscous fluids (76D45) Liquid-gas two-phase flows, bubbly flows (76T10)
Related Items (6)
Three dimensional interaction of two drops driven by buoyancy ⋮ Numerical simulation of two-dimensional binary droplets collision outcomes using the level set method ⋮ Numerical simulation of buoyant drops suspended in Poiseuille flow at nonzero Reynolds numbers ⋮ An overview of non-Newtonian nanofluid flow in macro- and micro-channels using two-phase schemes ⋮ Coalescence of surfactant-laden drops by phase field method ⋮ Artificial neural network joined with lattice Boltzmann method to study the effects of MHD on the slip velocity of FMWNT/water nanofluid flow inside a microchannel
Cites Work
- Unnamed Item
- Numerical analysis of blood flow in the heart
- Direct numerical simulations of bubbly flows. Part 1. Low Reynolds number arrays
- Numerical simulation of a concentrated emulsion in shear flow
- A numerical study of the motion of drops in Poiseuille flow. Part 1. Lateral migration of one drop
- Buoyancy-driven interactions between two deformable viscous drops
- Viscosity ratio effects on the coalescence of two equal-sized drops in a two-dimensional linear flow
- A numerical study of the shearing motion of emulsions and foams
- Pairwise interaction of capsules in simple shear flow: Three-dimensional effects
- Suspended Particles in Fluid Flow Through Tubes
- Direct simulation of initial value problems for the motion of solid bodies in a Newtonian fluid. Part 2. Couette and Poiseuille flows
- An adaptive mesh algorithm for evolving surfaces: simulations of drop breakup and coalescence
- A front-tracking method for the computations of multiphase flow.
This page was built for publication: Binary collision of drops in simple shear flow at finite Reynolds numbers: geometry and viscosity ratio effects
