Root subgroups on horospherical varieties
Abstract
Given a connected reductive algebraic group G and a spherical G-variety X, a B-root subgroup on X is a one-parameter additive group of automorphisms of X normalized by a Borel subgroup B ⊂ G. We obtain a complete description of all B-root subgroups on a certain open subset of X. When X is horospherical, we extend the construction of standard B-root subgroups introduced earlier by Arzhantsev and Avdeev for affine X and obtain a complete description of all standard B-root subgroups, which naturally generalizes the well-known description of root subgroups on toric varieties. As an application, for horospherical X that is either complete or contains a unique closed G-orbit, we determine all G-stable prime divisors in X that can be connected with the open G-orbit via the action of a suitable B-root subgroup. For horospherical X, we also find sufficient conditions for the existence of B-root subgroups on X that preserve the open B-orbit in X. Finally, when G is of semisimple rank 1 and X is horospherical and complete, we determine all B-root subgroups on X, which enables us to describe the Lie algebra of the connected automorphism group of X.
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