Hessian recovery based finite element methods for the Cahn-Hilliard equation

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DOI10.1016/j.jcp.2019.01.056zbMath1452.65255arXiv1810.09212OpenAlexW2897227399WikidataQ128284739 ScholiaQ128284739MaRDI QIDQ2218600

Qingsong Zou, Hailong Guo, Min-Qiang Xu

Publication date: 15 January 2021

Published in: Journal of Computational Physics (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1810.09212

zbMATH Keywords

Cahn-Hilliard equation superconvergence phase separation linear finite element Hessian recovery recovery based

Mathematics Subject Classification ID

Finite element, Rayleigh-Ritz and Galerkin methods for initial value and initial-boundary value problems involving PDEs (65M60) Applications to the sciences (65Z05) Pattern formations in context of PDEs (35B36)

Related Items (10)

Recovery based finite difference scheme on unstructured mesh ⋮ Comparison of different time discretization schemes for solving the Allen-Cahn equation ⋮ Gradient recovery based finite element methods for the two-dimensional quad-curl problem ⋮ A new recovery based \(C^0\) element method for fourth-order equations ⋮ A C⁰ linear finite element method for a second‐order elliptic equation in non‐divergence form with Cordes coefficients ⋮ A Hessian Recovery Based Linear Finite Element Method for Molecular Beam Epitaxy Growth Model with Slope Selection ⋮ Parametric Polynomial Preserving Recovery on Manifolds ⋮ A reduced order model for a stable embedded boundary parametrized Cahn-Hilliard phase-field system based on cut finite elements ⋮ Superconvergent gradient recovery for virtual element methods ⋮ A Hessian recovery-based finite difference method for biharmonic problems

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