An extension of Berwald's inequality and its relation to Zhang's inequality

Abstract

In this note prove the following Berwald-type inequality, showing that for any integrable log-concave function f: Rn→[0,∞) and any concave function h:L→ [0,∞), where L is the epigraph of - f f∞, then p (1(1+p)∫L e-tdtdx∫L hp(x,t)e-tdtdx)1p is decreasing in p∈(-1,∞), extending the range of p where the monotonicity is known to hold true. As an application of this extension, we will provide a new proof of a functional form of Zhang's reverse Petty projection inequality, recently obtained in [ABG].