An unconditionally energy-stable method for the phase field crystal equation

A novel second-order time accurate fully discrete finite element scheme with decoupling structure for the hydrodynamically-coupled phase field crystal model, Arbitrarily high order structure-preserving algorithms for the Allen-Cahn model with a nonlocal constraint, A linearly second-order, unconditionally energy stable scheme and its error estimates for the modified phase field crystal equation, Benchmark Computations of the Phase Field Crystal and Functionalized Cahn-Hilliard Equations via Fully Implicit, Nesterov Accelerated Schemes, Fully discrete spectral-Galerkin linear and unconditionally energy stable algorithm for the square phase-field crystal system, Unconditionally energy stable schemes for fluid-based topology optimization, Unconditionally energy stable time stepping scheme for Cahn-Morral equation: application to multi-component spinodal decomposition and optimal space tiling, Improving the accuracy of convexity splitting methods for gradient flow equations, Isogeometric analysis of high order partial differential equations on surfaces, The numerical simulation of the phase field crystal (PFC) and modified phase field crystal (MPFC) models via global and local meshless methods, Phase-field crystal equation with memory, Isogeometric analysis and error estimates for high order partial differential equations in fluid dynamics, Local Discontinuous Galerkin Method and High Order Semi-Implicit Scheme for the Phase Field Crystal Equation, Hybrid-degree weighted T-splines and their application in isogeometric analysis, The meshless local collocation method for solving multi-dimensional Cahn-Hilliard, Swift-Hohenberg and phase field crystal equations, Functional entropy variables: a new methodology for deriving thermodynamically consistent algorithms for complex fluids, with particular reference to the isothermal Navier-Stokes-Korteweg equations, Accurate, efficient, and (iso)geometrically flexible collocation methods for phase-field models, Sharp error estimate of an implicit BDF2 scheme with variable time steps for the phase field crystal model, Numerical approximations of flow coupled binary phase field crystal system: fully discrete finite element scheme with second-order temporal accuracy and decoupling structure, The geometric triharmonic heat flow of immersed surfaces near spheres, Well-posedness and long-time behavior for the modified phase-field crystal equation, Space of \(C^2\)-smooth geometrically continuous isogeometric functions on planar multi-patch geometries: dimension and numerical experiments, Convex splitting Runge-Kutta methods for phase-field models, A semi-analytical Fourier spectral method for the Swift-Hohenberg equation, A second-order, uniquely solvable, energy stable BDF numerical scheme for the phase field crystal model, First and second order numerical methods based on a new convex splitting for phase-field crystal equation, Long-time simulation of the phase-field crystal equation using high-order energy-stable CSRK methods, Parallel energy-stable phase field crystal simulations based on domain decomposition methods, A linearly second-order energy stable scheme for the phase field crystal model, A novel estimation method for microstructural evolution based on data assimilation and phase field crystal model, Efficient unconditionally stable numerical schemes for a modified phase field crystal model with a strong nonlinear vacancy potential, Error estimates with low-order polynomial dependence for the fully-discrete finite element invariant energy quadratization scheme of the Allen–Cahn equation, A linear adaptive second‐order backward differentiation formulation scheme for the phase field crystal equation, Stability and error estimates of the SAV Fourier-spectral method for the phase field crystal equation, A C⁰ interior penalty method for the phase field crystal equation, An efficient and robust Lagrange multiplier approach with a penalty term for phase-field models, Linearly first- and second-order, unconditionally energy stable schemes for the phase field crystal model, Highly efficient, decoupled and unconditionally stable numerical schemes for a modified phase-field crystal model with a strong nonlinear vacancy potential, Semi-implicit spectral deferred correction methods for highly nonlinear partial differential equations, A Second-Order, Linear, \(\boldsymbol{L^\infty}\)-Convergent, and Energy Stable Scheme for the Phase Field Crystal Equation, Two finite difference schemes for the phase field crystal equation, Numerical approximations for a new \(L^2\)-gradient flow based phase field crystal model with precise nonlocal mass conservation, Efficient second order unconditionally stable time marching numerical scheme for a modified phase-field crystal model with a strong nonlinear vacancy potential, Energy exchange analysis in droplet dynamics via the Navier–Stokes–Cahn–Hilliard model, Energy and entropy preserving numerical approximations of thermodynamically consistent crystal growth models, Error estimates for second-order SAV finite element method to phase field crystal model, Highly efficient and stable numerical algorithm for a two-component phase-field crystal model for binary alloys, Energy-production-rate preserving numerical approximations to network generating partial differential equations, Convergence analysis and numerical implementation of a second order numerical scheme for the three-dimensional phase field crystal equation, Efficient numerical methods for simulating surface tension of multi-component mixtures with the gradient theory of fluid interfaces, Unconditionally stable methods for simulating multi-component two-phase interface models with Peng-Robinson equation of state and various boundary conditions, Dimension and basis construction for \(C^2\)-smooth isogeometric spline spaces over bilinear-like \(G^2\) two-patch parameterizations, A meshless technique based on generalized moving least squares combined with the second-order semi-implicit backward differential formula for numerically solving time-dependent phase field models on the spheres, Energy-stable predictor-corrector schemes for the Cahn-Hilliard equation, A High Order Adaptive Time-Stepping Strategy and Local Discontinuous Galerkin Method for the Modified Phase Field Crystal Equation, A \(C^0\) interior penalty method for a von Kármán plate, Solving the triharmonic equation over multi-patch planar domains using isogeometric analysis, Linear second order energy stable schemes for phase field crystal growth models with nonlocal constraints, Space of \(C^2\)-smooth geometrically continuous isogeometric functions on two-patch geometries, On efficient numerical schemes for a two-mode phase field crystal model with face-centered-cubic (FCC) ordering structure, Isogeometric analysis of subcutaneous injection of monoclonal antibodies, Efficient and accurate numerical scheme for a magnetic-coupled phase-field-crystal model for ferromagnetic solid materials, Fast, unconditionally energy stable large time stepping method for a new Allen-Cahn type square phase-field crystal model, Novel energy stable schemes for Swift-Hohenberg model with quadratic-cubic nonlinearity based on the \(H^{-1}\)-gradient flow approach, An energy-stable generalized-\(\alpha\) method for the Swift-Hohenberg equation, An energy stable, hexagonal finite difference scheme for the 2D phase field crystal amplitude equations, First and second order operator splitting methods for the phase field crystal equation, Isogeometric analysis of a dynamic thermo-mechanical phase-field model applied to shape memory alloys, An isogeometric collocation approach for Bernoulli-Euler beams and Kirchhoff plates, A NURBS-based immersed methodology for fluid-structure interaction, Kansa RBF collocation method with auxiliary boundary centres for high order BVPs, Arbitrarily High-Order Unconditionally Energy Stable Schemes for Thermodynamically Consistent Gradient Flow Models, \(C^s\)-smooth isogeometric spline spaces over planar bilinear multi-patch parameterizations, Numerical approximation of the two-component PFC models for binary colloidal crystals: efficient, decoupled, and second-order unconditionally energy stable schemes, An efficient linear second order unconditionally stable direct discretization method for the phase-field crystal equation on surfaces, A simple and efficient finite difference method for the phase-field crystal equation on curved surfaces, The variational collocation method, An energy-stable time-integrator for phase-field models, A second order unconditionally stable scheme for the modified phase field crystal model with elastic interaction and stochastic noise effect, An efficient and stable compact fourth-order finite difference scheme for the phase field crystal equation, First- and second-order energy stable methods for the modified phase field crystal equation, Full-scale, three-dimensional simulation of early-stage tumor growth: the onset of malignancy, Energy stable and convergent finite element schemes for the modified phase field crystal equation, A fully-discrete decoupled finite element method for the conserved Allen-Cahn type phase-field model of three-phase fluid flow system, A review on computational modelling of phase-transition problems, Efficient linear and unconditionally energy stable schemes for the modified phase field crystal equation, Decoupled, Linear, and Unconditionally Energy Stable Fully Discrete Finite Element Numerical Scheme for a Two-Phase Ferrohydrodynamics Model, A structure-preserving and variable-step BDF2 Fourier pseudo-spectral method for the two-mode phase field crystal model, Numerical Methods for a Multicomponent Two-Phase Interface Model with Geometric Mean Influence Parameters, Robust exponential attractors for the modified phase-field crystal equation

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• Provably unconditionally stable, second-order time-accurate, mixed variational methods for phase-field models
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