Sums, projections, and sections of lattice sets, and the discrete covariogram

Abstract

Basic properties of finite subsets of the integer lattice ℤ n are investigated from the point of view of geometric tomography. Results obtained concern the Minkowski addition of convex lattice sets and polyominoes, discrete X-rays and the discrete and continuous covariogram, the determination of symmetric convex lattice sets from the cardinality of their projections on hyperplanes, and a discrete version of Meyer's inequality on sections of convex bodies by coordinate hyperplanes. © 2005 Springer Science+Business Media, Inc.