Litcius/Paper detail

Error Estimate of a Second Order Accurate Scalar Auxiliary Variable (SAV) Numerical Method for the Epitaxial Thin Film Equation

Qing Cheng, Cheng Wang Cheng Wang

2021Advances in Applied Mathematics and Mechanics61 citationsDOIOpen Access PDF

Abstract

A second order accurate (in time) numerical scheme is analyzed for the slope-selection (SS) equation of the epitaxial thin film growth model, with Fourier pseudo-spectral discretization in space. To make the numerical scheme linear while preserving the nonlinear energy stability, we make use of the scalar auxiliary variable (SAV) approach, in which a modified Crank-Nicolson is applied for the surface diffusion part. The energy stability could be derived a modified form, in comparison with the standard Crank-Nicolson approximation to the surface diffusion term. Such an energy stability leads to an H 2 bound for the numerical solution. In addition, this H 2 bound is not sufficient for the optimal rate convergence analysis, and we establish a uniform-in-time H 3 bound for the numerical solution, based on the higher order Sobolev norm estimate, combined with repeated applications of discrete H lder inequality and nonlinear embeddings in the Fourier pseudo-spectral space. This discrete H 3 bound for the numerical solution enables us to derive the optimal rate error estimate for this alternate SAV method. A few numerical experiments are also presented, which confirm the efficiency and accuracy of the proposed scheme.

Topics & Concepts

DiscretizationMathematicsScalar (mathematics)Mathematical analysisNonlinear systemNumerical analysisFourier seriesSobolev spaceFourier transformRate of convergenceUpper and lower boundsNorm (philosophy)Applied mathematicsPhysicsGeometryQuantum mechanicsElectrical engineeringEngineeringLawChannel (broadcasting)Political scienceSolidification and crystal growth phenomenaFluid Dynamics and Thin FilmsMetallurgical Processes and Thermodynamics
Error Estimate of a Second Order Accurate Scalar Auxiliary Variable (SAV) Numerical Method for the Epitaxial Thin Film Equation | Litcius