The subnormal structure of classical-like groups over commutative rings

Abstract

Let n be an integer greater than or equal to 3 and (R,) a Hermitian form ring where R is commutative. We prove that if H is a subgroup of the odd-dimensional unitary group U2n+1(R,) normalised by a relative elementary subgroup EU2n+1((R,),(I,)), then there is an odd form ideal (J,) such that EU2n+1((R,),(JIk,JIk·+ Ik))≤ H ≤ CU2n+1((R,),(J,)) where k=12 if n=3 respectively k=10 if n≥ 4. As a conseqence of this result we obtain a sandwich theorem for subnormal subgroups of odd-dimensional unitary groups.