Characterizing unit spheres in Euclidean spaces via reach and volume
Abstract
Let M be a smooth, connected, compact submanifold of Rn without boundary and of dimension k≥ 2. Let Sk ⊂ Rk+1⊂ Rn denote the k-dimesnional unit sphere. We show if M has reach equal to one, then its volume satisfies vol(M)≥ vol(Sk) with equality holding only if M is congruent to Sk.
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