Etale representations for reductive algebraic groups with factors Spn or SOn

Abstract

A complex vector space V is an \'etale G-module if G acts rationally on V with a Zariski-open orbit and G= V. Such a module is called super-\'etale if the stabilizer of a point in the open orbit is trivial. Popov proved that reductive algebraic groups admitting super-\'etale modules are special algebraic groups. He further conjectured that a reductive group admitting a super-\'etale module is always isomorphic to a product of general linear groups. In light of previously available examples, one can conjecture more generally that in such a group all simple factors are either SLn for some n or Sp2. We show that this is not the case by constructing a family of super-\'etale modules for groups with a factor Spn for arbitrary n≥1. A similar construction provides a family of \'etale modules for groups with a factor SOn, which shows that groups with \'etale modules with non-trivial stabilizer are not necessarily special. Both families of examples are somewhat surprising in light of the previously known examples of \'etale and super-\'etale modules for reductive groups. Finally, we show that the exceptional groups F4 and E8 cannot appear as simple factors in the maximal semisimple subgroup of an arbitrary Lie group with a linear \'etale representation.