English

Integral points on varieties defined by matrix factorization into elementary matrices

Number Theory 2019-01-29 v1 Algebraic Geometry

Abstract

Let O{\mathcal O} be the ring of SS-integers in a number field KK. For ASL2(O)A\in\rm{SL}_{2}(\mathcal{O}) and k1k\geq 1, we define matrix-factorization varieties Vk(A)V_k(A) over O{\mathcal O} which parametrize factoring AA into a product of kk elementary matrices; the equations defining Vk(A)V_k(A) are written in terms of Euler's continuant polynomials. We show that the Vk(A)V_k(A) are rational (k3)(k-3)-folds with an inductive fibration structure. We combine this geometric structure with arithmetic results to study the Zariski closure of the O{\mathcal O}-points of Vk(A)V_k(A). We prove that for k4k\geq 4 the O{\mathcal O}-points on Vk(A)V_k(A) are Zariski dense if Vk(A)(O)V_{k}(A)({\mathcal O})\neq\emptyset assuming the group of units O×{\mathcal O}^{\times} is infinite. This shows that if AA can be written as a product of k4k\geq 4 elementary matrices, then this can be done in infinitely many ways in the strongest sense possible. This can then be combined with results on factoring into elementary matrices for SL2(O){\rm SL}_{2}({\mathcal O}). One result is that for k9k\geq 9 the O{\mathcal O}-points on Vk(A)V_{k}(A) are Zariski dense if O×{\mathcal O}^{\times} is infinite.

Keywords

Cite

@article{arxiv.1901.09433,
  title  = {Integral points on varieties defined by matrix factorization into elementary matrices},
  author = {Bruce W. Jordan and Yevgeny Zaytman},
  journal= {arXiv preprint arXiv:1901.09433},
  year   = {2019}
}
R2 v1 2026-06-23T07:23:29.664Z