On Rogers-Shephard type inequalities for the lattice point enumerator

Abstract

In this paper we study various Rogers-Shephard type inequalities for the lattice point enumerator Gn(·) on Rn. In particular, for any non-empty convex bounded sets K,L⊂Rn, we show that \[Gn(K+L)Gn(K(-L)) ≤2nn Gn(K+(-1,1)n)Gn(L+(-1,1)n). \] and \[ Gn-k(PH K)Gk(K H)≤nkGn(K+(-1,1)n), \] for H=lin\e1,…,ek\, k∈\1,…,n-1\. Additionally, a discrete counterpart to a classical result by Berwald for concave functions, from which other discrete Rogers-Shephard type inequalities may be derived, is shown. Furthermore, we prove that these new discrete analogues for Gn(·) imply the corresponding results involving the Lebesgue measure.