Inverting the wedge map and Gauss composition

Abstract

Let 1 k n, and let v1,…,vk be integral vectors in Zn. We consider the wedge map αn,k : (Zn)k /SLk(Z) → k(Zn), (v1,…,vk) → v1 ·s vk . In his Disquisitiones, Gauss proved that αn,2 is injective when restricted to a primitive system of vectors when defining his composition law for binary quadratic forms. He also gave an algorithm for inverting α3,2 in a different context on the representation of integers by ternary quadratic forms. We give here an explicit algorithm for inverting αn,2, and observe via Bhargava's composition law for Z2 Z2 Z2 cube that inverting α4,2 is the main algorithmic step in Gauss's composition law for binary quadratic forms. This places Gauss's composition as a special case of the geometric problem of inverting a wedge map which may be of independent interests. We also show that a given symmetric positive definite matrix A induces a natural metric on the integral Grassmannian Gn,k(Z) so that the map X → XTAX becomes norm preserving.