Elementary covering numbers in odd-dimensional unitary groups

Abstract

Let (K,) be a Hermitian form field and n≥ 3. We prove that if σ∈ U2n+1(K,) is a unitary matrix of level (K,), then any short root transvection Tij(x) is a product of 4 elementary unitary conjugates of σ and σ-1. Moreover, the bound 4 is sharp. We also show that any extra short root transvection Ti(x,y) is a product of 12 elementary unitary conjugates of σ and σ-1. If the level of σ is (0,K× 0), then any (0,K× 0)-elementary extra short root transvection Ti(x,0) is a product of 2 elementary unitary conjugates of σ and σ-1.