Line Transversals of Convex Polyhedra in 3

Abstract

We establish a bound of O(n2k1+), for any >0, on the combinatorial complexity of the set of line transversals of a collection of k convex polyhedra in 3 with a total of n facets, and present a randomized algorithm which computes the boundary of in comparable expected time. Thus, when k n, the new bounds on the complexity (and construction cost) of improve upon the previously best known bounds, which are nearly cubic in n. To obtain the above result, we study the set of line transversals which emanate from a fixed line 0, establish an almost tight bound of O(nk1+) on the complexity of , and provide a randomized algorithm which computes in comparable expected time. Slightly improved combinatorial bounds for the complexity of , and comparable improvements in the cost of constructing this set, are established for two special cases, both assuming that the polyhedra of are pairwise disjoint: the case where 0 is disjoint from the polyhedra of , and the case where the polyhedra of are unbounded in a direction parallel to 0.