A mobility-SAV approach for a Cahn-Hilliard equation with degenerate mobilities

A novel numerical strategy is introduced for computing approximations of solutions to a Cahn-Hilliard model with degenerate mobilities. This model has recently been introduced as a second-order phase-field approximation for surface diffusion flows. Its numerical discretization is challenging due to the degeneracy of the mobilities, which generally requires an implicit treatment to avoid stability issues at the price of increased complexity costs. To mitigate this drawback, we consider new first- and second-order Scalar Auxiliary Variable (SAV) schemes that, differently from existing approaches, focus on the relaxation of the mobility, rather than the Cahn-Hilliard energy. These schemes are introduced and analysed theoretically in the general context of gradient flows and then specialised for the Cahn-Hilliard equation with mobilities. Various numerical experiments are conducted to highlight the advantages of these new schemes in terms of accuracy, effectiveness and computational cost.

• Publication year

  2023

• Venue

  Discrete and Continuous Dynamical Systems. Series A

• Publication date

  2023-06-27

• Fields of study

  Mathematics, Physics, Computer Science, Engineering

• Identifiers
  DOI 10.48550/arXiv.2306.15329arXiv 2306.15329
• External record

  Open on Semantic Scholar

• Source metadata

  Semantic Scholar

• No claims are published for this paper.

• No concepts are published for this paper.

• A Structure-Preserving, Upwind-SAV Scheme for the Degenerate Cahn–Hilliard Equation with Applications to Simulating Surface Diffusion

  2023cited by this paper
• Energy-stable and boundedness preserving numerical schemes for the Cahn-Hilliard equation with degenerate mobility

  2023cited by this paper
• Generalized SAV-exponential integrator schemes for Allen-Cahn type gradient flows

  2022cited by this paper
• Application of scalar auxiliary variable scheme to phase-field equations

  2022cited by this paper
• A generalized SAV approach with relaxation for dissipative systems

  2022cited by this paper
• Improving the Accuracy and Consistency of the Scalar Auxiliary Variable (SAV) Method with Relaxation

  2021cited by this paper
• A multiphase Cahn-Hilliard system with mobilities and the numerical simulation of dewetting

  2021influential reference
• REMARKS ON THE ASYMPTOTIC BEHAVIOR OF SCALAR AUXILIARY VARIABLE (SAV) SCHEMES FOR GRADIENT-LIKE FLOWS

  2020cited by this paper
• Approximation of surface diffusion flow: a second order variational Cahn-Hilliard model with degenerate mobilities

  2020influential reference
• Doubly degenerate diffuse interface models of anisotropic surface diffusion

  2020cited by this paper
• A Highly Efficient and Accurate New Scalar Auxiliary Variable Approach for Gradient Flows

  2020cited by this paper
• The role of degenerate mobilities in Cahn‐Hilliard models

  2019cited by this paper
• On a transmission problem for equation and dynamic boundary condition of Cahn–Hilliard type with nonsmooth potentials

  2019cited by this paper
• A variant of scalar auxiliary variable approaches for gradient flows

  2019cited by this paper
• Phase-field modelling and computing for a large number of phases

  2019cited by this paper
• The phase field method for geometric moving interfaces and their numerical approximations

  2019cited by this paper
• The exponential scalar auxiliary variable (E-SAV) approach for phase field models and its explicit computing

  2019cited by this paper
• Energy-Decaying Extrapolated RK-SAV Methods for the Allen-Cahn and Cahn-Hilliard Equations

  2019cited by this paper
• The Cahn–Hilliard Equation: Recent Advances and Applications

  2019cited by this paper
• Doubly degenerate diffuse interface models of surface diffusion

  2019cited by this paper
• The scalar auxiliary variable (SAV) approach for gradient flows

  2018cited by this paper
• A family of second-order energy-stable schemes for Cahn-Hilliard type equations

  2018cited by this paper
• Complex dewetting scenarios of ultrathin silicon films for large-scale nanoarchitectures

  2017cited by this paper
• Morphological Evolution of Pit-Patterned Si(001) Substrates Driven by Surface-Energy Reduction

  2017cited by this paper
• Unconditionally stable methods for gradient flow using Convex Splitting Runge-Kutta scheme

  2017cited by this paper
• Multiphase mean curvature flows with high mobility contrasts: A phase-field approach, with applications to nanowires

  2017cited by this paper
• Convexity splitting in a phase field model for surface diffusion

  2017cited by this paper
• A new phase field model for inhomogeneous minimal partitions, and applications to droplets dynamics

  2017cited by this paper
• First and second order numerical methods based on a new convex splitting for phase-field crystal equation

  2016cited by this paper
• Dynamics of pit filling in heteroepitaxy via phase-field simulations

  2016cited by this paper
• Computational studies of coarsening rates for the Cahn-Hilliard equation with phase-dependent diffusion mobility

  2016cited by this paper
• Degenerate mobilities in phase field models are insufficient to capture surface diffusion

  2015cited by this paper
• Faceting of Equilibrium and Metastable Nanostructures: A Phase-Field Model of Surface Diffusion Tackling Realistic Shapes

  2015cited by this paper
• Sharp-Interface Limits of the Cahn-Hilliard Equation with Degenerate Mobility

  2015cited by this paper
• On a Cahn-Hilliard type phase field system related to tumor growth

  2014cited by this paper
• Coarsening Mechanism for Systems Governed by the Cahn-Hilliard Equation with Degenerate Diffusion Mobility

  2014cited by this paper
• Free Energy of a Nonuniform System. I. Interfacial Free Energy and Free Energy of a Nonuniform System. III. Nucleation in a Two‐Component Incompressible Fluid

  2013cited by this paper
• A simple and efficient scheme for phase field crystal simulation

  2013cited by this paper
• Motion of Interfaces Governed by the Cahn-Hilliard Equation with Highly Disparate Diffusion Mobility

  2012cited by this paper
• Unconditionally stable schemes for higher order inpainting

  2011cited by this paper
• Provably unconditionally stable, second-order time-accurate, mixed variational methods for phase-field models

  2011cited by this paper
• A modified phase field approximation for mean curvature flow with conservation of the volume

  2009cited by this paper
• An Energy-Stable and Convergent Finite-Difference Scheme for the Phase Field Crystal Equation

  2009cited by this paper
• What is spinodal decomposition

  2008cited by this paper
• Comparison of phase-field models for surface diffusion.

  2007cited by this paper
• An efficient algorithm for solving the phase field crystal model

  2006cited by this paper
• Surface evolution of elastically stressed films under deposition by a diffuse interface model

  2006cited by this paper
• Applications of semi-implicit Fourier-spectral method to phase field equations

  2004cited by this paper
• Unconditionally Gradient Stable Time Marching the Cahn-Hilliard Equation

  1998cited by this paper
• The Cahn–Hilliard equation with a concentration dependent mobility: motion by minus the Laplacian of the mean curvature

  1996cited by this paper
• Convergence of the Cahn-Hilliard equation to the Hele-Shaw model

  1994cited by this paper
• Front migration in the nonlinear Cahn-Hilliard equation

  1989cited by this paper
• On the Cahn-Hilliard equation

  1986cited by this paper
• Free Energy of a Nonuniform System. I. Interfacial Free Energy

  1958cited by this paper

• A Cahn--Hilliard--Willmore phase field model for non-oriented interfaces

  2024cites this paper