On the zone of the boundary of a convex body

Abstract

We consider an arrangement of n hyperplanes in d and the zone in of the boundary of an arbitrary convex set in d in such an arrangement. We show that, whereas the combinatorial complexity of is known only to be O<nd-1 n> APS, the outer part of the zone has complexity O<nd-1> (without the logarithmic factor). Whether this bound also holds for the complexity of the inner part of the zone is still an open question (even for d=2).