Integral points on varieties defined by matrix factorization into elementary matrices

Abstract

Let O be the ring of S-integers in a number field K. For A∈SL2(O) and k≥ 1, we define matrix-factorization varieties Vk(A) over O which parametrize factoring A into a product of k elementary matrices; the equations defining Vk(A) are written in terms of Euler's continuant polynomials. We show that the Vk(A) are rational (k-3)-folds with an inductive fibration structure. We combine this geometric structure with arithmetic results to study the Zariski closure of the O-points of Vk(A). We prove that for k≥ 4 the O-points on Vk(A) are Zariski dense if Vk(A)( O)≠ assuming the group of units O× is infinite. This shows that if A can be written as a product of k≥ 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). One result is that for k≥ 9 the O-points on Vk(A) are Zariski dense if O× is infinite.