On commutators of unipotent matrices of index 2

Abstract

A commutator of unipotent matrices of index 2 is a matrix of the form XYX-1Y-1, where X and Y are unipotent matrices of index 2, that is, X In, Y In, and (X-In)2=(Y-In)2=0n. If n>2 and F is a field with | F|≥ 4, then it is shown that every n× n matrix over F with determinant 1 is a product of at most four commutators of unipotent matrices of index 2. Consequently, every n× n matrix over F with determinant 1 is a product of at most eight unipotent matrices of index 2. Conditions on F are given that improve the upper bound on the commutator factors from four to three or two. The situation for n=2 is also considered. This study reveals a connection between factorability into commutators of unipotent matrices and properties of F such as its characteristic or its set of perfect squares.