On the existence of nonnegative continuous solutions of the Cahn-Hilliard equation

We study solutions of the stationary Cahn Hilliard equation in a bounded smooth domain which have a spike in the interior. We show that a large class of interior points (the ``nondegenerate peak'' points) have the following property: There exist such solutions whose spike lies close to a given nonde

## Abstract A spectral Galerkin method in the spatial discretization is analyzed to solve the Cahn‐Hilliard equation. Existence, uniqueness, and stabilities for both the exact solution and the approximate solution are given. Using the theory and technique of a priori estimate for the partial differ

## Abstract We consider a solution of the Cahn–Hilliard equation or an associated Caginalp problem with dynamic boundary condition in the case of a general potential and prove that under some conditions on the potential it converges, as __t__ → ∞, to a stationary solution. The main tool will be the

We show that, as = Ä 0, the solution of the Cahn Hilliard equation converges to a solution of the Mullins Sekerka problem &2u=0 in each phase, where & denotes a normal, V the normal velocity and K the sum of principal curvatures of the interface, provided the solutions are radially symmetric. We u