A second order splitting method for the Cahn-Hilliard equation

This paper reports a fully discretized scheme for the Cahn-Hilliard equation. The method uses a convexity-splitting scheme to discretize in the temporal variable and a nonconforming finite element method to discretize in the spatial variable. And, the scheme can preserve the mass conservation and en

A splitting of a third-order partial differential equation into a first-order and a second-order one is proposed as the basis for a mixed finite element method to approximate its solution. A time-continuous numerical method is described and error estimates for its solution are demonstrated. Finally,

In this note, we study a Cahn-Hilliard equation in a deformable elastic isotropic continuum. We define boundary conditions associated with the problem and obtain the existence and uniqueness of solutions. We also study the long time behavior of the system.

A finite difference method is analyzed for the approximation of the solution of the evolutionary fourth-order in space, Sivashinsky equation. We prove that the scheme has a unique solution and we study error estimation for the numerical scheme. ~