Arbitrarily high-order linear energy stable schemes for gradient flow models

The Hamiltonian structure and fast energy-preserving algorithms for the fractional Klein-Gordon equation ⋮ Numerical comparison of modified-energy stable SAV-type schemes and classical BDF methods on benchmark problems for the functionalized Cahn-Hilliard equation ⋮ A Stable Arbitrarily High Order Time-Stepping Method for Thermal Phase Change Problems ⋮ A remark on the invariant energy quadratization (IEQ) method for preserving the original energy dissipation laws ⋮ Efficient energy-preserving exponential integrators for multi-component Hamiltonian systems ⋮ On novel linear schemes for the Cahn-Hilliard equation based on an improved invariant energy quadratization approach ⋮ Numerical Approximations of Phase Field Models Using a General Class of Linear Time-Integration Schemes ⋮ High-order conservative energy quadratization schemes for the Klein-Gordon-Schrödinger equation ⋮ A phase field-based systematic multiscale topology optimization method for porous structures design ⋮ Arbitrary high-order linearly implicit energy-preserving algorithms for Hamiltonian PDEs ⋮ Linear energy stable numerical schemes for a general chemo-repulsive model ⋮ Scalar auxiliary variable approach for conservative/dissipative partial differential equations with unbounded energy functionals ⋮ Arbitrary high-order linear structure-preserving schemes for the regularized long-wave equation ⋮ A Novel Class of Energy-Preserving Runge-Kutta Methods for the Korteweg-de Vries Equation ⋮ Energy conserving discontinuous Galerkin method with scalar auxiliary variable technique for the nonlinear Dirac equation ⋮ Totally decoupled implicit-explicit linear scheme with corrected energy dissipation law for the phase-field fluid vesicle model ⋮ High-order Lagrange multiplier method for the coupled Klein-Gordon-Schrödinger system ⋮ Arbitrary high-order linearly implicit energy-conserving schemes for the Rosenau-type equation ⋮ On convergence of a novel linear conservative scheme for the two-dimensional fractional nonlinear Schrödinger equation with wave operator ⋮ On the SAV‐DG method for a class of fourth order gradient flows ⋮ Efficient unconditionally stable numerical schemes for a modified phase field crystal model with a strong nonlinear vacancy potential ⋮ Conservative unconditionally stable decoupled numerical schemes for the <scp>Cahn–Hilliard–Navier–Stokes–Darcy–Boussinesq</scp> system ⋮ High-order unconditionally maximum-principle-preserving parametric integrating factor Runge-Kutta schemes for the nonlocal Allen-Cahn equation ⋮ Arbitrarily high-order energy-preserving schemes for the Zakharov-Rubenchik equations ⋮ Second order, unconditionally stable, linear ensemble algorithms for the magnetohydrodynamics equations ⋮ High-order linearly implicit schemes conserving quadratic invariants ⋮ Consistency-enhanced SAV BDF2 time-marching method with relaxation for the incompressible Cahn-Hilliard-Navier-Stokes binary fluid model ⋮ Arbitrary High-Order Structure-Preserving Schemes for Generalized Rosenau-Type Equations ⋮ A computationally optimal relaxed scalar auxiliary variable approach for solving gradient flow systems ⋮ Modified diffuse interface fluid model and its consistent energy-stable computation in arbitrary domains ⋮ Arbitrarily High-Order Energy-Preserving Schemes for the Camassa-Holm Equation Based on the Quadratic Auxiliary Variable Approach ⋮ Second order stabilized semi-implicit scheme for the Cahn-Hilliard model with dynamic boundary conditions ⋮ Linear multi-step methods and their numerical stability for solving gradient flow equations ⋮ A high-order linearly implicit energy-preserving Partitioned Runge-Kutta scheme for a class of nonlinear dispersive equations ⋮ An unconditionally energy-stable and orthonormality-preserving iterative scheme for the Kohn-Sham gradient flow based model ⋮ Stabilized enhancement for large time computation using exponential spectral process method ⋮ Unconditionally energy stable discontinuous Galerkin schemes for the Cahn-Hilliard equation ⋮ Energy-production-rate preserving numerical approximations to network generating partial differential equations ⋮ Supplementary variable method for thermodynamically consistent partial differential equations ⋮ First and second order unconditionally energy stable schemes for topology optimization based on phase field method ⋮ Numerical approximations and error analysis of the Cahn-Hilliard equation with reaction rate dependent dynamic boundary conditions ⋮ High-order linearly implicit structure-preserving exponential integrators for the nonlinear Schrödinger equation ⋮ High order unconditionally energy stable RKDG schemes for the Swift-Hohenberg equation ⋮ Linearly implicit and second-order energy-preserving schemes for the modified Korteweg-de Vries equation ⋮ A second-order unconditionally stable method for the anisotropic dendritic crystal growth model with an orientation-field

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• An \(H^2\) convergence of a second-order convex-splitting, finite difference scheme for the three-dimensional Cahn-Hilliard equation
• Simulating binary fluid-surfactant dynamics by a phase field model
• An adaptive time-stepping strategy for solving the phase field crystal model
• Unconditionally stable methods for gradient flow using convex splitting Runge-Kutta scheme
• Numerical approximations of Allen-Cahn and Cahn-Hilliard equations
• Conservative multigrid methods for ternary Cahn-Hilliard systems
• Unconditionally stable schemes for equations of thin film epitaxy
• Thermodynamically-consistent phase-field models for solidification
• Linear second order in time energy stable schemes for hydrodynamic models of binary mixtures based on a spatially pseudospectral approximation
• Linear, first and second-order, unconditionally energy stable numerical schemes for the phase field model of homopolymer blends
• Numerical approximations for the molecular beam epitaxial growth model based on the invariant energy quadratization method
• Efficient and accurate numerical schemes for a hydro-dynamically coupled phase field diblock copolymer model
• The scalar auxiliary variable (SAV) approach for gradient flows
• Energy-stable Runge-Kutta schemes for gradient flow models using the energy quadratization approach
• Regularized linear schemes for the molecular beam epitaxy model with slope selection
• A second order energy stable linear scheme for a thin film model without slope selection
• The Legendre collocation method for the Cahn--Hilliard equation
• A linear energy stable scheme for a thin film model without slope selection
• A family of second-order energy-stable schemes for Cahn-Hilliard type equations
• A variant of scalar auxiliary variable approaches for gradient flows
• Efficient modified techniques of invariant energy quadratization approach for gradient flows
• Adaptive time-stepping algorithms for molecular beam epitaxy: based on energy or roughness
• Efficient linear schemes with unconditional energy stability for the phase field elastic bending energy model
• Mass conservative and energy stable finite difference methods for the quasi-incompressible Navier-Stokes-Cahn-Hilliard system: primitive variable and projection-type schemes
• An energy stable fourth order finite difference scheme for the Cahn-Hilliard equation
• A third order exponential time differencing numerical scheme for no-slope-selection epitaxial thin film model with energy stability
• Improving the accuracy of convexity splitting methods for gradient flow equations
• Second order schemes and time-step adaptivity for Allen-Cahn and Cahn-Hilliard models
• A second-order, weakly energy-stable pseudo-spectral scheme for the Cahn-Hilliard equation and its solution by the homogeneous linear iteration method
• Convex splitting Runge-Kutta methods for phase-field models
• Solving the regularized, strongly anisotropic Cahn-Hilliard equation by an adaptive nonlinear multigrid method
• Arbitrarily high-order unconditionally energy stable SAV schemes for gradient flow models
• On fully practical finite element approximations of degenerate Cahn-Hilliard systems
• Second-order Convex Splitting Schemes for Gradient Flows with Ehrlich–Schwoebel Type Energy: Application to Thin Film Epitaxy
• Discrete Variational Derivative Method
• An Adaptive Time-Stepping Strategy for the Molecular Beam Epitaxy Models
• An Energy-Stable and Convergent Finite-Difference Scheme for the Phase Field Crystal Equation
• Stability Criteria for Implicit Runge–Kutta Methods
• A second‐order energy stable backward differentiation formula method for the epitaxial thin film equation with slope selection
• Second Order Fully Discrete Energy Stable Methods on Staggered Grids for Hydrodynamic Phase Field Models of Binary Viscous Fluids
• Stability and convergence of a second-order mixed finite element method for the Cahn–Hilliard equation
• A Second-Order Energy Stable BDF Numerical Scheme for the Cahn-Hilliard Equation
• Stabilized Predictor-Corrector Schemes for Gradient Flows with Strong Anisotropic Free Energy
• Energy-Decaying Extrapolated RK--SAV Methods for the Allen--Cahn and Cahn--Hilliard Equations
• Arbitrarily High-Order Unconditionally Energy Stable Schemes for Thermodynamically Consistent Gradient Flow Models
• Free Energy of a Nonuniform System. I. Interfacial Free Energy
• A New Class of Efficient and Robust Energy Stable Schemes for Gradient Flows
• A simple and efficient scheme for phase field crystal simulation
• An Unconditionally Energy Stable Immersed Boundary Method with Application to Vesicle Dynamics
• Stability and convergence of second-order schemes for the nonlinear epitaxial growth model without slope selection
• Efficient and linear schemes for anisotropic Cahn-Hilliard model using the stabilized-invariant energy quadratization (S-IEQ) approach