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Anisotropic curvature measures and uniqueness of convex bodies

Published 3 Aug 2021 in math.MG and math.DG | (2108.01476v2)

Abstract: We prove that an arbitrary convex body $C \subseteq \mathbf{R}{n+1} $, whose $ k $-th anisotropic curvature measure (for $ k =0, \ldots , n-1 $) is a multiple constant of the anisotropic perimeter of C, must be a rescaled and translated Wulff shape.This result provides a generalization of a theorem of Schneider (1979) and resolves a conjecture of Andrews and Wei (2017).

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