Clifford Tori and the singularly perturbed Cahn-Hilliard equation

Abstract

In this paper we construct entire solutions u to the Cahn-Hilliard equation -2(-2 u+W'(u))+W"(u)(-2 u+W'(u))=0, under the volume constraint ∫R3(1-u)dx=42π2, whose nodal set approaches the Clifford Torus, that is the Torus with radii of ratio 1/2 embedded in R3, as 0. What is crucial is that the Clifford Torus is a Willmore hypersurface and it is non-degenerate, up to conformal transformations. The proof is based on the Lyapunov-Schmidt reduction and on careful geometric expansions of the laplacian.