Spherical Schubert varieties and pattern avoidance
Abstract
A normal variety X is called H-spherical for the action of the complex reductive group H if it contains a dense orbit of some Borel subgroup of H. We resolve a conjecture of Hodges--Yong by showing that their spherical permutations are characterized by permutation pattern avoidance. Together with results of Gao--Hodges--Yong this implies that the sphericality of a Schubert variety Xw with respect to the largest possible Levi subgroup is characterized by this same pattern avoidance condition.
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