Convex hulls of spheres and convex hulls of convex polytopes lying on parallel hyperplanes

Abstract

Given a set of spheres in Ed, with d3 and d odd, having a fixed number of m distinct radii 1,2,...,m, we show that the worst-case combinatorial complexity of the convex hull CHd() of is (Σ1ijmninjd2), where ni is the number of spheres in with radius i. To prove the lower bound, we construct a set of (n1+n2) spheres in Ed, with d3 odd, where ni spheres have radius i, i=1,2, and 21, such that their convex hull has combinatorial complexity (n1n2d2+n2n1d2). Our construction is then generalized to the case where the spheres have m3 distinct radii. For the upper bound, we reduce the sphere convex hull problem to the problem of computing the worst-case combinatorial complexity of the convex hull of a set of m d-dimensional convex polytopes lying on m parallel hyperplanes in Ed+1, where d3 odd, a problem which is of independent interest. More precisely, we show that the worst-case combinatorial complexity of the convex hull of a set \P1,P2,...,Pm\ of m d-dimensional convex polytopes lying on m parallel hyperplanes of Ed+1 is O(Σ1ijmninjd2), where ni is the number of vertices of Pi. We end with algorithmic considerations, and we show how our tight bounds for the parallel polytope convex hull problem, yield tight bounds on the combinatorial complexity of the Minkowski sum of two convex polytopes in Ed.