Stability of axial free-boundary hyperplanes in circular cones
Abstract
Given an axially-symmetric, (n+1)-dimensional convex cone ⊂ Rn+1, we study the stability of the free-boundary minimal surface obtained by intersecting with a n-plane that contains the axis of . In the case n=2, is always unstable, as a special case of the vertex-skipping property that we recently proved in another article. Conversely, as soon as n 3 and has a sufficiently large aperture (depending on the dimension n), we show that is strictly stable. For our stability analysis, we introduce a Lipschitz flow t[f] of deformations of associated with a compactly-supported, scalar deformation field f, which satisfies the key property ∂ t[f] ⊂ ∂ for all t∈ R. Then, we compute the lower-right second variation of the area of along the flow, and ultimately show that it is positive by exploiting its connection with a functional inequality studied in the context of reaction-diffusion problems.
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