Operations between sets in geometry

Abstract

An investigation is launched into the fundamental characteristics of operations on and between sets, with a focus on compact convex sets and star sets (compact sets star-shaped with respect to the origin) in n-dimensional Euclidean space n. For example, it is proved that if n 2, with three trivial exceptions, an operation between origin-symmetric compact convex sets is continuous in the Hausdorff metric, GL(n) covariant, and associative if and only if it is Lp addition for some 1 p∞. It is also demonstrated that if n 2, an operation * between compact convex sets is continuous in the Hausdorff metric, GL(n) covariant, and has the identity property (i.e., K*\o\=K=\o\*K for all compact convex sets K, where o denotes the origin) if and only if it is Minkowski addition. Some analogous results for operations between star sets are obtained. An operation called M-addition is generalized and systematically studied for the first time. Geometric-analytic formulas that characterize continuous and GL(n)-covariant operations between compact convex sets in terms of M-addition are established. The term "polynomial volume" is introduced for the property of operations * between compact convex or star sets that the volume of rK*sL, r,s 0, is a polynomial in the variables r and s. It is proved that if n 2, with three trivial exceptions, an operation between origin-symmetric compact convex sets is continuous in the Hausdorff metric, GL(n) covariant, associative, and has polynomial volume if and only if it is Minkowski addition.