Connecting orbits in quasiaffine spherical varieties via B-root subgroups
Abstract
Given a connected reductive algebraic group G with a Borel subgroup B and a quasiaffine spherical G-variety X, we prove that every G-orbit Y contained in the regular locus of X can be connected by a B-normalized additive one-parameter group action with any minimal G-orbit in X containing Y in its closure. As a consequence, we show that the regular locus of X is transitive for the subgroup in the automorphism group of X generated by G and all B-normalized additive one-parameter subgroups.
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