On orbit closures of spherical subgroups in flag varieties

Abstract.

Let \( \cal F \) be the flag variety of a complex semi-simple group G, let H be an algebraic subgroup of G acting on \( \cal F \) with finitely many orbits, and let V be an H-orbit closure in \( \cal F \). Expanding the cohomology class of V in the basis of Schubert classes defines a union V₀ of Schubert varieties in \( \cal F \) with positive multiplicities. If G is simply-laced, we show that these multiplicities are equal to the same power of 2. For arbitrary G, we show that V₀ is connected in codimension 1. If moreover all multiplicities are 1, we show that the singularities of V are rational and we construct a flat degeneration of V to V₀ in \( \cal F \). Thus, for any effective line bundle L on \( \cal F \), the restriction map \( {H}^0({\cal F}, {\rm L}) \to {H}^0({\rm V, L} \) is surjective, and \( {H}^n({\rm V, L}) = 0 \) for all \( n \geq 1 \).