Overgroups of elementary block-diagonal subgroups in the classical symplectic group over an arbitrary commutative ring

Abstract

In this paper we prove a sandwich classification theorem for subgroups of the classical symplectic group over an arbitrary commutative ring R that contain the elementary block-diagonal (or subsystem) subgroup Ep(, R) corresponding to a unitary equivalence realation such that all self-conjugate equivalence classes of are of size at least 4 and all not-self-conjugate classes of are of size at least 5. Namely, given a subgroup H of Sp(2n, R) such that Ep(, R) H we show that there exists a unique exact major form net of ideals (σ, ) over R such that Ep(σ, ) H NSp(2n,R)(Sp(σ, )). Further, we describe the normalizer NSp(2n,R)(Sp(σ, )) in terms of congruences.