Mass and Volume Conservation in Phase Field Models for Binary Fluids
From MaRDI portal
Publication:4588782
DOI10.4208/cicp.300711.160212azbMath1373.76317OpenAlexW1980471618MaRDI QIDQ4588782
Xiao-Feng Yang, Qi Wang, Jie Shen
Publication date: 27 October 2017
Published in: Communications in Computational Physics (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/7cf8990af0eaa4daf1bbd405636b52dba4aea547
Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70) Multiphase and multicomponent flows (76Txx)
Related Items (35)
Second order approximation for a quasi-incompressible Navier-Stokes Cahn-Hilliard system of two-phase flows with variable density ⋮ Convergence analysis of an unconditionally energy stable projection scheme for magneto-hydrodynamic equations ⋮ A decoupled energy stable scheme for a hydrodynamic phase-field model of mixtures of nematic liquid crystals and viscous fluids ⋮ Simulation of three-component fluid flows using the multiphase lattice Boltzmann flux solver ⋮ On the re-initialization of fluid interfaces in diffuse interface method ⋮ An energy-stable finite-difference scheme for the binary fluid-surfactant system ⋮ An efficient scheme for a phase field model for the moving contact line problem with variable density and viscosity ⋮ Diffuse-interface two-phase flow models with different densities: A new quasi-incompressible form and a linear energy-stable method ⋮ A consistent and conservative phase-field method for multiphase incompressible flows ⋮ Energy Stable and Mass Conservative Numerical Method for Gas Flow in Porous Media with Rock Compressibility ⋮ Numerical approximations for a phase-field moving contact line model with variable densities and viscosities ⋮ Efficient and accurate numerical schemes for a hydro-dynamically coupled phase field diblock copolymer model ⋮ An energy stable, conservative and bounds‐preserving numerical method for thermodynamically consistent modeling of incompressible two‐phase flow in porous media with rock compressibility ⋮ A unified framework for Navier–Stokes Cahn–Hilliard models with non-matching densities ⋮ Two-phase flows with bulk-surface interaction: thermodynamically consistent Navier-Stokes-Cahn-Hilliard models with dynamic boundary conditions ⋮ Phase field modeling and computation of vesicle growth or shrinkage ⋮ Decoupled, Linear, and Energy Stable Finite Element Method for the Cahn--Hilliard--Navier--Stokes--Darcy Phase Field Model ⋮ Fully Discrete Second-Order Linear Schemes for Hydrodynamic Phase Field Models of Binary Viscous Fluid Flows with Variable Densities ⋮ Numerical approximations for a three-component Cahn–Hilliard phase-field model based on the invariant energy quadratization method ⋮ An unconditionally energy-stable scheme based on an implicit auxiliary energy variable for incompressible two-phase flows with different densities involving only precomputable coefficient matrices ⋮ An energy stable \(C^0\) finite element scheme for a quasi-incompressible phase-field model of moving contact line with variable density ⋮ Second Order Fully Discrete Energy Stable Methods on Staggered Grids for Hydrodynamic Phase Field Models of Binary Viscous Fluids ⋮ A second-order accurate, unconditionally energy stable numerical scheme for binary fluid flows on arbitrarily curved surfaces ⋮ Numerical approximations for the Cahn-Hilliard phase field model of the binary fluid-surfactant system ⋮ Two-phase incompressible flows with variable density: an energetic variational approach ⋮ On Linear and Unconditionally Energy Stable Algorithms for Variable Mobility Cahn-Hilliard Type Equation with Logarithmic Flory-Huggins Potential ⋮ A generalized lattice Boltzmann model for fluid flow system and its application in two-phase flows ⋮ An efficient numerical method for simulating multiphase flows using a diffuse interface model ⋮ The stabilized penalty-projection finite element method for the Navier-Stokes-Cahn-Hilliard-Oono system ⋮ Efficient, adaptive energy stable schemes for the incompressible Cahn-Hilliard Navier-Stokes phase-field models ⋮ Decoupled energy stable schemes for a phase-field model of two-phase incompressible flows with variable density ⋮ Energy Decaying Phase-Field Model for Fluid-Particle Interaction in Two-Phase Flow ⋮ Linear and unconditionally energy stable schemes for the binary fluid-surfactant phase field model ⋮ Numerical approximations to a new phase field model for two phase flows of complex fluids ⋮ Thermodynamically consistent phase-field modelling of activated solute transport in binary solvent fluids
This page was built for publication: Mass and Volume Conservation in Phase Field Models for Binary Fluids
