Demazure roots and spherical varieties: the example of horizontal SL(2)-actions

Abstract

Let G be a connected reductive group, and let X be an affine G-spherical variety. We show that the classification of Ga-actions on X normalized by G can be reduced to the description of quasi-affine homogeneous spaces under the action of a semi-direct product Ga G with the following property. The induced G-action is spherical and the complement of the open orbit is either empty or a G-orbit of codimension one. These homogeneous spaces are parametrized by a subset Rt(X) of the character lattice X(G) of G, which we call the set of Demazure roots of X. We give a complete description of the set Rt(X) when G is a semi-direct product of SL2 and an algebraic torus; we show particularly that Rt(X) can be obtained explicitly as the intersection of a finite union of polyhedra in QZX(G) and a sublattice of X(G). We conjecture that Rt(X) can be described in a similar combinatorial way for an arbitrary affine spherical variety X.