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The following pages link to Efficient modified techniques of invariant energy quadratization approach for gradient flows (Q2275190):

Displaying 41 items.

Energy-stable Runge-Kutta schemes for gradient flow models using the energy quadratization approach (Q1739508) (← links)
Novel energy stable schemes for Swift-Hohenberg model with quadratic-cubic nonlinearity based on the \(H^{-1}\)-gradient flow approach (Q2028031) (← links)
Linear, second-order accurate, and energy stable scheme for a ternary Cahn-Hilliard model by using Lagrange multiplier approach (Q2042537) (← links)
Numerical study of the ternary Cahn-Hilliard fluids by using an efficient modified scalar auxiliary variable approach (Q2045970) (← links)
The stabilized-trigonometric scalar auxiliary variable approach for gradient flows and its efficient schemes (Q2061423) (← links)
Step-by-step solving schemes based on scalar auxiliary variable and invariant energy quadratization approaches for gradient flows (Q2066189) (← links)
High order unconditionally energy stable RKDG schemes for the Swift-Hohenberg equation (Q2075953) (← links)
New efficient and unconditionally energy stable schemes for the Cahn-Hilliard-Brinkman system (Q2077098) (← links)
On efficient semi-implicit auxiliary variable methods for the six-order Swift-Hohenberg model (Q2088854) (← links)
Linearly implicit and second-order energy-preserving schemes for the modified Korteweg-de Vries equation (Q2098794) (← links)
Energy dissipation-preserving time-dependent auxiliary variable method for the phase-field crystal and the Swift-Hohenberg models (Q2118966) (← links)
Arbitrarily high-order linear energy stable schemes for gradient flow models (Q2125416) (← links)
An efficiently linear and totally decoupled variant of SAV approach for the binary phase-field surfactant fluid model (Q2129530) (← links)
Linear and fully decoupled scheme for a hydrodynamics coupled phase-field surfactant system based on a multiple auxiliary variables approach (Q2133588) (← links)
Scalar auxiliary variable approach for conservative/dissipative partial differential equations with unbounded energy functionals (Q2162723) (← links)
Novel high-order energy-preserving diagonally implicit Runge-Kutta schemes for nonlinear Hamiltonian ODEs (Q2184902) (← links)
A fast and efficient numerical algorithm for fractional Allen-Cahn with precise nonlocal mass conservation (Q2184969) (← links)
Efficient modified stabilized invariant energy quadratization approaches for phase-field crystal equation (Q2192575) (← links)
A fast and efficient numerical algorithm for Swift-Hohenberg equation with a nonlocal nonlinearity (Q2233251) (← links)
A revisit of the energy quadratization method with a relaxation technique (Q2233338) (← links)
A non-iterative and unconditionally energy stable method for the Swift-Hohenberg equation with quadratic-cubic nonlinearity (Q2236745) (← links)
A linearized energy-conservative scheme for two-dimensional nonlinear Schrödinger equation with wave operator (Q2243218) (← links)
A block-centered finite difference method for the nonlinear Sobolev equation on nonuniform rectangular grids (Q2286131) (← links)
Two fast and efficient linear semi-implicit approaches with unconditional energy stability for nonlocal phase field crystal equation (Q2301311) (← links)
Stability and convergence based on the finite difference method for the nonlinear fractional cable equation on non-uniform staggered grids (Q2301442) (← links)
Convergence analysis for the invariant energy quadratization (IEQ) schemes for solving the Cahn-Hilliard and Allen-Cahn equations with general nonlinear potential (Q2302404) (← links)
On the convergence of an unconditionally stable numerical scheme for the Q-tensor flow based on the invariant quadratization method (Q2677880) (← links)
The Exponential Scalar Auxiliary Variable (E-SAV) Approach for Phase Field Models and Its Explicit Computing (Q5112636) (← links)
REMARKS ON THE ASYMPTOTIC BEHAVIOR OF SCALAR AUXILIARY VARIABLE (SAV) SCHEMES FOR GRADIENT-LIKE FLOWS (Q5858072) (← links)
Efficient numerical scheme for a new hydrodynamically-coupled conserved Allen-Cahn type Ohta-Kawaski phase-field model for diblock copolymer melt (Q6040091) (← links)
Efficient unconditionally stable numerical schemes for a modified phase field crystal model with a strong nonlinear vacancy potential (Q6066218) (← links)
Accurate and efficient algorithms with unconditional energy stability for the time fractional Cahn–Hilliard and Allen–Cahn equations (Q6066503) (← links)
Energy stability and convergence of the scalar auxiliary variable Fourier‐spectral method for the viscous Cahn–Hilliard equation (Q6071681) (← links)
Compact difference scheme for <scp>two‐dimensional fourth‐order</scp> nonlinear hyperbolic equation (Q6088432) (← links)
The fast scalar auxiliary variable approach with unconditional energy stability for nonlocal Cahn–Hilliard equation (Q6088449) (← links)
A high order accurate numerical algorithm for the space-fractional Swift-Hohenberg equation (Q6103698) (← links)
Unconditionally energy-stable linear convex splitting algorithm for the \(L^2\) quasicrystals (Q6147799) (← links)
An efficient linearly implicit and energy‐conservative scheme for two dimensional Klein–Gordon–Schrödinger equations (Q6147904) (← links)
Highly efficient variant of SAV approach for the incompressible multi-component phase-field fluid models (Q6176681) (← links)
Quad-SAV scheme for gradient systems (Q6489277) (← links)
Error estimate of a fully decoupled numerical scheme based on the scalar auxiliary variable (SAV) method for the Boussinesq system (Q6591767) (← links)