Bernstein-type theorem for stationary hypersurfaces of the Euler-Dierkes-Huisken functional
Abstract
We say that a hypersurface Σ⊂Rn+1 is α-stationary if it is a critical point of the Euler-Dierkes-Huisken functional Eα(Σ)=∫Σ|X|α\, dHn, introduced by Dierkes and Huisken in [DH-24]. In this paper, we prove that every smooth, complete, connected, embedded α-stationary hypersurface in Rn+1 passing through the origin with α>0 is a linear hyperplane.
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