Subgroups of Chevalley groups of types Bl and Cl containing the group over a subring and corresponding carpets

Abstract

We continue study of subgroups of a Chevalley group GP(,R) over a ring R with a root system and a weight lattice P, containing the elementary subgroup EP(,K) over a subring K of R. Recently A. Bak and A. Stepanov considered the symplectic case (i. e. the case of simply connected group of type =Cl) in characteristic 2. In this article we extend their result for groups with arbitrary weight lattice of types Bl and Cl. Similarly to the work of Nuzhin that handles the case of an algebraic extension R of a nonperfect field K of bad characteristic, we use in the description a special kind of carpet subgroups. In the second half of the article we study Bruhat and Gauss decompositions for these carpet subgroups.