Expressing Matrices Into Products of Commutators of Involutions, Skew-Involutions, Finite Order and Skew Finite Order Matrices

Abstract

Let R be an associative ring with unity 1 and consider that 2,k and 2k∈ N are invertible in R. For m≥ 1 denote by UTn(m,R) and UT∞(m,R), the subgroups of UTn(R) and UT∞(R) respectively, which have zero entries on the first m-1 super diagonals. We show that every element on the groups UTn(m,R) and UT∞(m,R) can be expressed as a product of two commutators of involutions and also, can be expressed as a product of two commutators of skew-involutions and involutions in UT∞(m,R). Similarly, denote by UT(s)∞(R) the group of upper triangular infinite matrices whose diagonal entries are sth roots of 1. We show that every element of the groups UTn(∞,R) and UT∞(m,R) can be expressed as a product of 4k-6 commutators all depending of powers of elements in UT(k)∞(m,R) of order k and, also, can be expressed as a product of 8k-6 commutators of skew finite matrices of order 2k and matrices of order 2k in UT(2k)∞(m,R). If R is the complex field or the real number field we prove that, in SLn(R) and in the subgroup SLVK(∞,R) of the Vershik-Kerov group over R, each element in these groups can be decomposed into a product of commutators of elements as described above.