Spherical affine cones in exceptional cases and related branching rules

Abstract

Given a complex simply connected simple algebraic group G of exceptional type and a maximal parabolic subgroup P ⊂ G, we classify all triples (G,P,H) such that H ⊂ G is a maximal reductive subgroup acting spherically on G/P. In addition we derive branching rules for resGH (V*kωi), k ∈ , where ωi is the fundamental weight associated to P. This is the first of two parts of a project to classify all such triples and corresponding branching rules for all simply connected simple algebraic groups.