On partially segregated harmonic maps: optimal regularity and structure of the free boundary
Abstract
We consider triplets of densities (u1,u2,u3) minimizing the Dirichlet energy \[Σj=13 ∫ |∇ uj|2\,dx \] over a bounded domain ⊂ RN, subject to the partial segregation condition: \[ u1\,u2\,u3 0 \ in . \] We prove optimal regularity of the minimizers in spaces of H\"older continuous functions of exponent 3/4; furthermore we prove that the free boundary is a collection of a locally finite number of smooth codimension one manifolds up to a residual set of Hausdorff dimension at most N-2. Finally we prove uniform-in-β a priori bounds for minimal solutions to the penalized energy: \[ Jβ(u, ) = ∫ Σi=13 |∇ ui|2 \,dx+ β ∫ Πj=13 uj2\,dx, \] in spaces of H\"older continuous functions of exponent less than 3/4. The proofs make use of an Almgren-type monotonicity formula, blow-up analysis together with some new Liouville-type theorems.
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