Measure theory in the geometry of GL(n, Z) Zn

Abstract

The n-dimensional affine group over the integers is the group Gn of all affinities on Rn which leave the lattice Zn invariant. Gn yields a geometry in the classical sense of the Erlangen Program. In this paper we construct a Gn-invariant measure on rational polyhedra in Rn, i.e., finite unions of simplexes with rational vertices in Rn, and prove its uniqueness. Our main tool is given by the Morelli-Wodarczyk factorization of birational toric maps in blow-ups and blow-downs (solution of the weak Oda conjecture).