The inhomogeneous Allen--Cahn equation and the existence of prescribed-mean-curvature hypersurfaces

Abstract

We prove that for any given compact Riemannian manifold N of dimension n+1 ≥ 3 and any non-negative Lipschitz function g on N, there exists a quasi-embedded, boundaryless hypersurface M ⊂ N, of class C2, α for any α ∈ (0,1), such that M is the image of a two-sided immersion whose mean curvature is given by g for an appropriate choice of continuous unit normal to the immersion; and moreover, the singular set = M M is empty if 2 ≤ n ≤ 6, finite if n=7 and satisfies Hn-7 + γ() = 0 for every γ >0 if n ≥ 8. Here quasi-embedded means that near every non-embedded point, M is the union of two embedded C2, α disks intersecting tangentially with each disk lying on one side of the other. If g >0 then M is the boundary of a Caccioppoli set. Our proof of this theorem is PDE theoretic and relies, when g>0 and g∈ C1,1(N), on (i) a mountain pass construction of solutions to the inhomogeneous Allen--Cahn equation and (ii) a regularity result for integral varifolds arising from a Morse-index bounded, energy bounded, sequence of solutions to the (inhomogeneous) Allen--Cahn equation. The case of non-negative Lipschitz g follows by approximation, based on the estimates that we establish.