Bubbling of almost critical points of anisotropic isoperimetric problems with degenerating ellipticity
Abstract
Given a sequence of uniformly convex norms φh on Rn+1 converging to an arbitrary norm φ , we prove rigidity of L1 -accumulation points of sequences of sets Eh ⊂eq Rn+1 of finite perimeter, that are volume-constrained almost-critical points of the anisotropic surface energy functionals associated with φh . Here, almost criticality is measured in terms of the Ln -deviation from being constant of the distributional anisotropic mean φh -curvature of (the varifold associated to) of the reduced boundaries of Eh . We prove that such limits are finite union of disjoint, but possibly mutually tangent, φ -Wulff shapes.
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