A Brunn-Minkowski Inequality for the Integer Lattice
A close discrete analog of the classical Brunn-Minkowksi inequality that holds for finite subsets of the integer lattice is obtained. This is applied to obtain strong new lower bounds for the cardinality of the sum of two finite sets, one of which has full dimension, and, in fact, a method for computing the exact lower bound in this situation, given the dimension of the lattice and the cardinalities of the two sets. These bounds in turn imply corresponding new bounds for the lattice point enumerator of the Minkowski sum of two convex lattice polytopes. A Rogers-Shephard type inequality for the lattice point enumerator in the plane is also proved.
Object Details
Creators/Contributors
- Gardner, Richard J. - author
- Gronchi, Paolo - author
Collection
collections Mathematics Faculty Publications | Mathematics
Identifier
1024
Date Issued
January 1st, 2001
Language
Resource type
Related Series
Access conditions
Copying of this document in whole or in part is allowable only for scholarly purposes. It is understood, however, that any copying or publication of this document for commercial purposes, or for financial gain, shall not be allowed without the author's written permission.
Bibliographic History
First published in The Transactions of the American Mathematical Society in Volume 353, Number 10, 2001, published by the American Mathematical Society
Subject Topics
- Brunn-Minkowski inequality
- Lattice
- Lattice polygon
- Convex lattice polytope
- Lattice point enumerator
- Sum set
- Difference set