Clifford Tori and the singularly perturbed Cahn–Hilliard equation

Abstract: In this paper we construct entire solutions u ε to the Cahn-Hilliard equation −ε 2 ∆(−ε 2 ∆u + W ′ (u)) + W ′′ (u)(−ε 2 ∆u + W ′ (u)) = 0, under the volume constraint R 3 (1 − u ε )dx = 4 √ 2π 2 , whose nodal set approaches the Clifford Torus, that is the Torus with radii of ratio 1/ √ 2 embedded in R 3 , as ε → 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 g… Show more

“…provided the constant C 1 is large enough. This step of the proof is similar to that in Section 6, 2 of [35]. In order to prove existence, we have to show that S 1 maps the ball into itself, provided the constant is large enough, and that it is Lipschitz continuous in V with Lipschitz constant of order ε.…”

“…It is possible to find further details in [15], where the periodic case is specifically treated. This latter issue is common to interface constructions, see for example [34] and [35], and treated in a similar manner. Now we set φ := R 1/ε φ and we consider the change of variables t := z − φ (εs), which corresponds to replacing φ by φ in the expansion of the Laplacian (22).…”

“…As in [35], we want to use Fermi coordinates near a normal perturbation of the dilated periodic curve γ T . To this end, we fix φ ∈ C 4,ᾱ T (R) (recall (13)) such that φ C 4,α (R) < 1 , and for T large (i.e.…”

“…, where, we recall, φ and its derivatives are evaluated at εs. Hence by (20) the expansion we are interested in, using the latter coordinates (s, t), is given by (28) and (29) in [35].…”

“…Due to a recent result in [30], establishing the so-called Willmore conjecture, this torus minimizes the Willmore energy among all surfaces of positive genus. In [35], up to a small Lagrange multiplier, solutions of (3) in R 3 were found with interfaces approaching a Clifford torus, converging to −1 in its interior and to +1 on its exterior.…”

Periodic Solutions to a Cahn–Hilliard–Willmore Equation in the Plane

“…provided the constant C 1 is large enough. This step of the proof is similar to that in Section 6, 2 of [35]. In order to prove existence, we have to show that S 1 maps the ball into itself, provided the constant is large enough, and that it is Lipschitz continuous in V with Lipschitz constant of order ε.…”

“…It is possible to find further details in [15], where the periodic case is specifically treated. This latter issue is common to interface constructions, see for example [34] and [35], and treated in a similar manner. Now we set φ := R 1/ε φ and we consider the change of variables t := z − φ (εs), which corresponds to replacing φ by φ in the expansion of the Laplacian (22).…”

“…As in [35], we want to use Fermi coordinates near a normal perturbation of the dilated periodic curve γ T . To this end, we fix φ ∈ C 4,ᾱ T (R) (recall (13)) such that φ C 4,α (R) < 1 , and for T large (i.e.…”

“…, where, we recall, φ and its derivatives are evaluated at εs. Hence by (20) the expansion we are interested in, using the latter coordinates (s, t), is given by (28) and (29) in [35].…”

“…Due to a recent result in [30], establishing the so-called Willmore conjecture, this torus minimizes the Willmore energy among all surfaces of positive genus. In [35], up to a small Lagrange multiplier, solutions of (3) in R 3 were found with interfaces approaching a Clifford torus, converging to −1 in its interior and to +1 on its exterior.…”

Periodic Solutions to a Cahn–Hilliard–Willmore Equation in the Plane

Solutions with single radial interface of the generalized Cahn–Hilliard flow

Solutions with multiple interfaces to the generalized parabolic Cahn–Hilliard equation in one and three space dimensions