Abstract
Given a nondegenerate minimal hypersurface Σ in a Riemannian manifold, we prove that, for all ε small enough there exists uε, a critical point of the Allen-Cahn energy Eε(u) = ε2 ∫ |∇u|2 + ∫(1 − u2)2, whose nodal set converges to Σ as ε tends to 0. Moreover, if Σ is a volume nondegenerate constant mean curvature hypersurface, then the same conclusion holds with the function uε being a critical point of Eε under some volume constraint.
Citation
Frank Pacard. Manuel Ritoré. "From Constant mean Curvature Hypersurfaces to the Gradient Theory of Phase Transitions." J. Differential Geom. 64 (3) 359 - 423, July, 2003. https://doi.org/10.4310/jdg/1090426999
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