A SECOND-ORDER CONVEX SPLITTING SCHEME FOR A CAHN-HILLIARD EQUATION WITH VARIABLE INTERFACIAL PARAMETERS 被引量：3

A SECOND-ORDER CONVEX SPLITTING SCHEME FOR A CAHN-HILLIARD EQUATION WITH VARIABLE INTERFACIAL PARAMETERS

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摘要 In this paper, the MMC-TDGL equation, a stochastic Cahn-Hilliard equation with a variable interfacial parameter, is solved numerically by using a convex splitting scheme which is second-order in time for the non-stochastic part in combination with the Crank- Nicolson and the Adams-Bashforth methods. For the non-stochastic case, the uncondi- tional energy stability is obtained in the sense that a modified energy is non-increasing. The scheme in the stochastic version is then obtained by adding the discretized stochastic term. Numerical experiments are carried out to verify the second-order convergence rate for the non-stochastic case~ and to show the long-time stochastic evolutions using larger time steps. In this paper, the MMC-TDGL equation, a stochastic Cahn-Hilliard equation with a variable interfacial parameter, is solved numerically by using a convex splitting scheme which is second-order in time for the non-stochastic part in combination with the Crank- Nicolson and the Adams-Bashforth methods. For the non-stochastic case, the uncondi- tional energy stability is obtained in the sense that a modified energy is non-increasing. The scheme in the stochastic version is then obtained by adding the discretized stochastic term. Numerical experiments are carried out to verify the second-order convergence rate for the non-stochastic case~ and to show the long-time stochastic evolutions using larger time steps.

作者 Xiao Li Zhonghua Qiao Hui Zhang

机构地区 Applied and Computational Mathematics Division Department of Applied Mathematics Laboratory of Mathematics and Complex Systems

出处《Journal of Computational Mathematics》 SCIE CSCD 2017年第6期693-710,共18页 计算数学（英文）

关键词 Cahn-Hilliard equation Second-order accuracy Convex splitting Energy stability. Cahn-Hilliard equation, Second-order accuracy, Convex splitting, Energy stability.

分类号 O175.26 [理学—基础数学] TN407 [电子电信—微电子学与固体电子学]

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参考文献3

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