Normality of DSER elementary orthogonal group

Abstract

Let (Q, q) be a quadratic space over a commutative ring R in which 2 is invertible, and consider the Dickson--Siegel--Eichler--Roy's subgroup EOR(Q, H(R)m) of the orthogonal group OR(Q H(R)m), with rank Q= n ≥ 1 and m≥ 2. We show that EOR(Q, H(R)m) is a normal subgroup of OR(Q H(R)m), for all m≥ 2. We also prove that the DSER group EOR(Q, H(P)) is a normal subgroup of OR(Q H(P)), where Q and H(P) are quadratic spaces over a commutative ring R, with rank (Q) 1 and rank (P) 2.