Subring subgroups in symplectic groups in characteristic 2

Abstract

In 2012 the second author obtained a description of the lattice of subgroupsof a Chevalley group G(,A), containing the elementary subgroup E(,K) over a subring K⊂eq A provided =Bn, Cn or F4, n2, and 2 is invertible in K. It turns out that this lattice splits into a disjoint union of "sandwiches", parametrized by intermediate subrings between K and A. In the current article a similar result is proved for =Bn or Cn, n3, and 2=0 in K. In this settings one has to introduce more sandwiches, namely, the sandwiches are parametrized by form rings (R,) such that K⊂eq⊂eq R⊂eq A. In particular, this result, generalizes a part of Ya.\,N.\,Nuzhin's theorem of 2013 concerning root systems =Bn, Cn, n3, where the same description of the subgroup lattice is obtained under the condition that A is an algebraic extension of~K.