Some inequalities of isoperimetric type for the c-affine surface area
Abstract
We study the c-affine surface area c, recently introduced by Sch\"utt, Werner and Yalikun. We show that on the class of ball-bodies, c is maximized by a ball of radius nn+1, and that a Santal\'o-type inequality holds: c(K) c(Kc) ≤ c(12 B2n)2. We also produce some more intricate inequalities involving the surface area.
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