English

Inverting the wedge map and Gauss composition

Number Theory 2024-07-04 v1

Abstract

Let 1kn,1 \le k \le n, and let v1,,vkv_1,\ldots,v_k be integral vectors in Zn\mathbb{Z}^n. We consider the wedge map αn,k:(Zn)k/SLk(Z)k(Zn)\alpha_{n,k} : (\mathbb{Z}^n)^k /SL_k(\mathbb{Z}) \rightarrow \wedge^k(\mathbb{Z}^n), (v1,,vk)v1vk(v_1,\ldots,v_k) \rightarrow v_1 \wedge \cdots \wedge v_k . In his Disquisitiones, Gauss proved that αn,2\alpha_{n,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\alpha_{3,2} in a different context on the representation of integers by ternary quadratic forms. We give here an explicit algorithm for inverting αn,2\alpha_{n,2}, and observe via Bhargava's composition law for Z2Z2Z2\mathbb{Z}^2 \otimes \mathbb{Z}^2 \otimes \mathbb{Z}^2 cube that inverting α4,2\alpha_{4,2} 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 AA induces a natural metric on the integral Grassmannian Gn,k(Z)G_{n,k}(\mathbb{Z}) so that the map XXTAXX \rightarrow X^TAX becomes norm preserving.

Keywords

Cite

@article{arxiv.2407.02523,
  title  = {Inverting the wedge map and Gauss composition},
  author = {Kok Seng Chua},
  journal= {arXiv preprint arXiv:2407.02523},
  year   = {2024}
}

Comments

10 pages

R2 v1 2026-06-28T17:27:00.794Z