Tracking interface and common curve dynamics for two-fluid flow in porous media
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Publication:4976664
DOI10.1017/jfm.2016.212zbMath1462.76183OpenAlexW2343485268MaRDI QIDQ4976664
William G. Gray, Cass T. Miller, Mark A. Berrill, James E. McClure
Publication date: 1 August 2017
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://www.osti.gov/biblio/1255655
Related Items (5)
The lattice Boltzmann method for nearly incompressible flows ⋮ Thermal lattice Boltzmann study of three-dimensional bubble growth in quiescent liquid ⋮ A macroscopic model for immiscible two-phase flow in porous media ⋮ Investigating an extended multiphase flow model that includes specific interfacial area ⋮ Pore-scale modelling of Ostwald ripening
Cites Work
- Unnamed Item
- Unnamed Item
- Direct numerical simulation of interfacial instabilities: A consistent, conservative, all-speed, sharp-interface method
- Mixed element FEM level set method for numerical simulation of immiscible fluids
- Effects of incompressibility on the elimination of parasitic currents in the lattice Boltzmann equation method for binary fluids
- Multirange multi-relaxation time Shan-Chen model with extended equilibrium
- Recent progress in the moving contact line problem: a review
- An evaluation of lattice Boltzmann schemes for porous medium flow simulation
- Evaluation of two lattice Boltzmann models for multiphase flows
- Moving contact lines in the Cahn-Hilliard theory
- A stable discretization of the lattice Boltzmann equation for simulation of incompressible two-phase flows at high density ratio
- Lattice Boltzmann method for moving boundaries.
- A novel representation of the surface tension force for two-phase flow with reduced spurious currents
- Numerical prediction of interfacial instabilities: Sharp interface method (SIM)
- Non-equilibrium effects in capillarity and interfacial area in two-phase flow: dynamic pore-network modelling
- A GENERAL MULTIPLE-RELAXATION-TIME BOLTZMANN COLLISION MODEL
- An improved three-dimensional model for interface pressure calculations in free-surface flows
- The dynamics of the spreading of liquids on a solid surface. Part 1. Viscous flow
- Moving contact lines in liquid/liquid/solid systems
- Contact-line dynamics of a diffuse fluid interface
- LATTICE BOLTZMANN METHOD FOR FLUID FLOWS
- Spurious currents in finite element based level set methods for two‐phase flow
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