On a generalized Cahn-Hilliard model with p-Laplacian

Abstract

A generalized Cahn-Hilliard model in a bounded interval of the real line with no-flux boundary conditions is considered. The label "generalized" refers to the fact that we consider a concentration dependent mobility, the p-Laplace operator with p>1 and a double well potential of the form F(u)=12θ|1-u2|θ, with θ>1; these terms replace, respectively, the constant mobility, the linear Laplace operator and the C2 potential satisfying F"(1)>0, which are typical of the standard Cahn-Hilliard model. After investigating the associated stationary problem and highlighting the differences with the standard results, we focus the attention on the long time dynamics of solutions when θ≥ p>1. In the critical θ=p>1, we prove exponentially slow motion of profiles with a transition layer structure, thus extending the well know results of the standard model, where θ=p=2; conversely, in the supercritical case θ>p>1, we prove algebraic slow motion of layered profiles.