Diversities and the Generalized Circumradius

Abstract

The generalized circumradius of a set of points A ⊂eq Rd with respect to a convex body K equals the minimum value of λ ≥ 0 such that A is contained in a translate of λ K. Each choice of K gives a different function on the set of bounded subsets of Rd; we characterize which functions can arise in this way. Our characterization draws on the theory of diversities, a recently introduced generalization of metrics from functions on pairs to functions on finite subsets. We additionally investigate functions which arise by restricting the generalised circumradius to a finite subset of Rd. We obtain elegant characterizations in the case that K is a simplex or parallelotope.

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