The canonical form, scissors congruence and adjoint degrees of polytopes

Abstract

We study the canonical form as a valuation in the context of scissors congruence for polytopes. We identify the degree of its numerator - the adjoint polynomial adjP - as an important invariant in this context. More precisely, for a polytope P we define the degree drop that measures how much smaller than expected the degree of the adjoint polynomial of P is. We show that this drop behaves well under various operations, such as decompositions, restrictions to faces, projections, products and Minkowski sums. Next we define the reduced canonical form 0 and show that it is a translation-invariant 1-homogeneous valuation on polytopes that vanishes if and only if P has positive degree drop. Using it we can prove that zonotopes can be characterized as the d-polytopes that have maximal possible degree drop d-1. We obtain a decomposition formula for 0 that expresses it as a sum of edge-local quantities of P. Finally, we discuss valuations s that can distinguish higher values of the degree drop.