Efficient second order unconditionally stable time marching numerical scheme for a modified phase-field crystal model with a strong nonlinear vacancy potential
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Publication:2696562
DOI10.1016/j.cpc.2019.106860OpenAlexW2969557115WikidataQ127373375 ScholiaQ127373375MaRDI QIDQ2696562
Publication date: 14 April 2023
Published in: Computer Physics Communications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cpc.2019.106860
Related Items (14)
A novel second-order time accurate fully discrete finite element scheme with decoupling structure for the hydrodynamically-coupled phase field crystal model ⋮ A linearly second-order, unconditionally energy stable scheme and its error estimates for the modified phase field crystal equation ⋮ Fully discrete spectral-Galerkin linear and unconditionally energy stable algorithm for the square phase-field crystal system ⋮ Efficient linear, decoupled, and unconditionally stable scheme for a ternary Cahn-Hilliard type Nakazawa-Ohta phase-field model for tri-block copolymers ⋮ A simple and practical finite difference method for the phase-field crystal model with a strong nonlinear vacancy potential on 3D surfaces ⋮ Efficient unconditionally stable numerical schemes for a modified phase field crystal model with a strong nonlinear vacancy potential ⋮ Highly efficient, decoupled and unconditionally stable numerical schemes for a modified phase-field crystal model with a strong nonlinear vacancy potential ⋮ A highly efficient and accurate new SAV approach for the modified phase field crystal model ⋮ Highly efficient and linear numerical schemes with unconditional energy stability for the anisotropic phase-field crystal model ⋮ Highly accurate, linear, and unconditionally energy stable large time-stepping schemes for the functionalized Cahn-Hilliard gradient flow equation ⋮ The IEQ and SAV approaches and their extensions for a class of highly nonlinear gradient flow systems ⋮ A structure-preserving and variable-step BDF2 Fourier pseudo-spectral method for the two-mode phase field crystal model ⋮ A second-order BDF scheme for the Swift-Hohenberg gradient flows with quadratic-cubic nonlinearity and vacancy potential ⋮ Energy dissipation-preserving time-dependent auxiliary variable method for the phase-field crystal and the Swift-Hohenberg models
Cites Work
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