Commutators of relative and unrelative elementary subgroups in Chevalley groups

Abstract

In the present paper, which is a direct sequel of our papers [10,11,35] joint with Roozbeh Hazrat, we achieve a further dramatic reduction of the generating sets for commutators of relative elementary subgroups in Chevalley groups. Namely, let be a reduced irreducible root system of rank 2, let R be a commutative ring and let A,B be two ideals of R. We consider subgroups of the Chevalley group G(,R) of type over R. The unrelative elementary subgroup E(,A) of level A is generated (as a group) by the elementary unipotents xα(a), α∈, a∈ A, of level A. Its normal closure in the absolute elementary subgroup E(,R) is denoted by E(,R,A) and is called the relative elementary subgroup of level A. The main results of [11,35] consisted in construction of economic generator sets for the mutual commutator subgroups [E(,R,A),E(,R,B)], where A and B are two ideals of R. It turned out that one can take Stein---Tits---Vaserstein generators of E(,R,AB), plus elementary commutators of the form yα(a,b)=[xα(a),x-α(b)], where a∈ A, b∈ B. Here we improve these results even further, by showing that in fact it suffices to engage only elementary commutators corresponding to one\/ long root, and that modulo E(,R,AB) the commutators yα(a,b) behave as symbols. We discuss also some further variations and applications of these results.