Lp-Rogers--Shephard type inequalities for Lp-zonoids and symmetric bodies
Abstract
We study generalizations of the classical Rogers--Shephard inequalities in the framework of Firey Lp-summation. We first consider the class of asymmetric Lp-zonoids. In this setting, we show that proving a sharp Lp-Rogers--Shephard inequality for asymmetric Lp-zonoids in Rn is equivalent to proving a sharp inequality between the volumes of projections of Bqm Rm+ and Bqm onto an n-dimensional subspace E, where q is the Hölder conjugate of p. We conjecture that the inequality is sharp when the subspace E is a coordinate subspace. We fully establish this inequality along with equality conditions in the case p =2. For general p, we prove it in the case n=m-1, n=1, and discuss several particular cases, including an averaged version and a local version of the inequality. We then turn to the setting of convex bodies having a center of symmetry. Rogers and Shephard also proved a sharp version of their inequality for bodies in this class. We conjecture a similar bound for the Lp-summation, and we establish our conjecture for the particular case of asymmetric L1-zonoids, which, in particular, proves our conjecture in the planar case.
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