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On volume and surface area of parallel sets. II. Surface measures and (non-)differentiability of the volume
Published 18 Jan 2023 in math.MG | (2301.07429v2)
Abstract: We prove that at differentiability points $r_0>0$ of the volume function of a compact set $A\subset {\mathbb R}d$ (associating to $r$ the volume of the $r$-parallel set of $A$), the surface area measures of $r$-parallel sets of $A$ converge weakly to the surface area measure of the $r_0$-parallel set as $r\to r_0$. We further study the question which sets of parallel radii can occur as sets of non-differentiability points of the volume function of some compact set. We provide a full characterization for dimensions $d=1$ and $2$.
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