Sandwich classification for GLn(R), O2n(R) and U2n(R,) revisited

Abstract

Let n be a natural number greater or equal to 3, R a commutative ring and σ∈ GLn(R). We show that tkl(σij) (resp. tkl(σii-σjj)) where i≠ j and k≠ l can be expressed as a product of 8 (resp. 24) matrices of the form εσ 1 where ε∈ En(R). We prove similar results for the orthogonal groups O2n(R) and the hyperbolic unitary groups U2n(R,) under the assumption that R is commutative and n≥ 3. This yields new, very short proofs of the Sandwich Classification Theorems for the groups GLn(R), O2n(R) and U2n(R,).