On the Inequalities of Projected Volumes and the Constructible Region

Abstract

We study the following geometry problem: given a 2n-1 dimensional vector π=\πS\S⊂eq [n], S , is there an object T⊂eqRn such that (vol(TS))= πS, for all S⊂eq [n], where TS is the projection of T to the subspace spanned by the axes in S? If π does correspond to an object in Rn, we say that π is constructible. We use n to denote the constructible region, i.e., the set of all constructible vectors in R2n-1. In 1995, Bollob\'as and Thomason showed that n is contained in a polyhedral cone, defined a class of so called uniform cover inequalities. We propose a new set of natural inequalities, called nonuniform-cover inequalities, which generalize the BT inequalities. We show that any linear inequality that all points in n satisfy must be a nonuniform-cover inequality. Based on this result and an example by Bollob\'as and Thomason, we show that constructible region n is not even convex, and thus cannot be fully characterized by linear inequalities. We further show that some subclasses of the nonuniform-cover inequalities are not correct by various combinatorial constructions, which refutes a previous conjecture about n. Finally, we conclude with an interesting conjecture regarding the convex hull of n.