Surfactants in foam stability: a phase-field model

Linear and fully decoupled scheme for a hydrodynamics coupled phase-field surfactant system based on a multiple auxiliary variables approach, Isogeometric analysis of the Cahn-Hilliard phase-field model, Fully-discrete, decoupled, second-order time-accurate and energy stable finite element numerical scheme of the Cahn-Hilliard binary surfactant model confined in the Hele-Shaw cell, An energy-stable finite-difference scheme for the binary fluid-surfactant system, Efficient, second oder accurate, and unconditionally energy stable numerical scheme for a new hydrodynamics coupled binary phase-field surfactant system, Numerical simulation of binary fluid-surfactant phase field model coupled with geometric curvature on the curved surface, A positivity-preserving and convergent numerical scheme for the binary fluid-surfactant system, On the Gamma convergence of functionals defined over pairs of measures and energy-measures, Decoupled, energy stable schemes for a phase-field surfactant model, The subdivision-based IGA-EIEQ numerical scheme for the binary surfactant Cahn-Hilliard phase-field model on complex curved surfaces, An adaptive time-stepping method for the binary fluid-surfactant phase field model on evolving surfaces, Stability and convergence analysis of the exponential time differencing scheme for a Cahn-Hilliard binary fluid-surfactant model, Well-posedness of a Navier–Stokes–Cahn–Hilliard system for incompressible two-phase flows with surfactant, A BDF2 energy‐stable scheme for the binary fluid‐surfactant hydrodynamic model, Convergence of phase-field free energy and boundary force for molecular solvation, Efficient, non-iterative, and decoupled numerical scheme for a new modified binary phase-field surfactant system, A phase-field moving contact line model with soluble surfactants, Isogeometric analysis of the isothermal Navier-Stokes-Korteweg equations, Finite element approximation of the Cahn-Hilliard equation on surfaces, Numerical approximations for the Cahn-Hilliard phase field model of the binary fluid-surfactant system, On the use of local maximum entropy approximants for Cahn-Hilliard phase-field models in 2D domains and on surfaces, Fully Decoupled, Linear and Unconditionally Energy Stable Schemes for the Binary Fluid-Surfactant Model, A general class of phase transition models with weighted interface energy, Provably unconditionally stable, second-order time-accurate, mixed variational methods for phase-field models, A novel fully-decoupled, second-order and energy stable numerical scheme of the conserved Allen-Cahn type flow-coupled binary surfactant model, Liquid-vapor transformations with surfactants. Phase-field model and isogeometric analysis, High Order Numerical Simulations for the Binary Fluid--Surfactant System Using the Discontinuous Galerkin and Spectral Deferred Correction Methods, Linear and unconditionally energy stable schemes for the binary fluid-surfactant phase field model, Numerical approximation of a phase-field surfactant model with fluid flow, A local meshless method for transient nonlinear problems: preliminary investigation and application to phase-field models, On a Novel Fully Decoupled, Second-Order Accurate Energy Stable Numerical Scheme for a Binary Fluid-Surfactant Phase-Field Model, On a thermodynamic framework for developing boundary conditions for Korteweg-type fluids

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• A sharp-interface limit for a two-well problem in geometrically linear elasticity
• Singular perturbations of variational problems arising from a two-phase transition model
• Minimal interface criterion for phase transitions in mixtures of Cahn- Hilliard fluids
• The effect of a singular perturbation on nonconvex variational problems
• Vector-valued local minimizers of nonconvex variational problems
• An introduction to \(\Gamma\)-convergence
• Singular perturbation and the energy of folds
• The gradient theory of phase transitions and the minimal interface criterion
• Line energies for gradient vector fields in the plane
• On the structure of equilibrium phase transitions within the gradient theory of fluids
• The gradient theory of phase transitions for systems with two potential wells
• Local minimisers and singular perturbations
• On the slowness of phase boundary motion in one space dimension
• Nonconvex variational problems with anisotropic perturbations
• On lower semicontinuity of a defect energy obtained by a singular limit of the Ginzburg–Landau type energy for gradient fields
• Anisotropic singular perturbations—the vectorial case
• Slow Motion in One-Dimensional Cahn–Morral Systems
• Second Order Singular Perturbation Models for Phase Transitions
• Metastable patterns in solutions of u_t = ϵ²u_xx − f(u)
• A Γ‐convergence result for the two‐gradient theory of phase transitions
• Convex Analysis