On extended weight monoids of spherical homogeneous spaces

Abstract

Given a connected reductive complex algebraic group G and a spherical subgroup H ⊂ G, the extended weight monoid +G(G/H) encodes the G-module structures on spaces of global sections of all G-linearized line bundles on G/H. Assuming that G is semisimple and simply connected and H is specified by a regular embedding in a parabolic subgroup P ⊂ G, in this paper we obtain a description of +G(G/H) via the set of simple spherical roots of G/H together with certain combinatorial data explicitly computed from the pair (P,H). As an application, we deduce a new proof of a result of Avdeev and Gorfinkel describing +G(G/H) in the case where H is strongly solvable.