Equality cases for the Lp-Rogers--Shephard inequality in the plane and for locally anti-blocking bodies in Rn
Abstract
The classical Rogers--Shephard inequalities were extended to the Firey Lp-summation by Bianchini and Colesanti in the plane and by Zvavitch and the second and fourth authors for locally anti-blocking convex bodies in Rn, leaving open the equality cases. We characterize the equality cases of these inequalities: in both cases, for p>1, equality holds if and only if the convex body is a simplex with one vertex at the origin.
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