Periodic solutions to the Cahn-Hilliard equation in the plane

Abstract

In this paper we construct entire solutions to the Cahn-Hilliard equation -(- u+W'(u))+W"(u)(- u+W'(u))=0 in the Euclidean plane, where W(u) is the standard double-well potential 14 (1-u2)2. Such solutions have a non-trivial profile that shadows a Willmore planar curve, and converge uniformly to 1 as x2 ∞. These solutions give a counterexample to the counterpart of Gibbons' conjecture for the fourth-order counterpart of the Allen-Cahn equation. We also study the x2-derivative of these solutions using the special structure of Willmore's equation.