Groups with BC-commutator relations

Abstract

Isotropic odd unitary groups generalize Chevalley groups of classical types over commutative rings and their twisted forms. Such groups have root subgroups parameterized by a root system BC and may be constructed by so-called odd form rings with Peirce decompositions. We show the converse: if a group G has root subgroups indexed by roots of BC and satisfying natural conditions, then there is a homomorphism StU(R, ) G inducing isomorphisms on the root subgroups, where StU(R, ) is the odd unitary Steinberg group constructed by an odd form ring (R, ) with a Peirce decomposition. For groups with root subgroups indexed by A (the already known case) the resulting odd form ring is essentially a generalized matrix ring.