1. Criteria for rational smoothness of some symmetric orbit closures
- Author
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Hultman, Axel
- Subjects
- *
SMOOTHNESS of functions , *MATHEMATICAL symmetry , *CLOSURE spaces , *LINEAR algebra , *GROUP theory , *WEYL groups , *TOPOLOGICAL degree , *INTERVAL analysis - Abstract
Abstract: Let G be a connected reductive linear algebraic group over with an involution θ. Denote by K the subgroup of fixed points. In certain cases, the K-orbits in the flag variety are indexed by the twisted identities in the Weyl group W. Under this assumption, we establish a criterion for rational smoothness of orbit closures which generalises classical results of Carrell and Peterson for Schubert varieties. That is, whether an orbit closure is rationally smooth at a given point can be determined by examining the degrees in a “Bruhat graph” whose vertices form a subset of ι. Moreover, an orbit closure is rationally smooth everywhere if and only if its corresponding interval in the Bruhat order on ι is rank symmetric. In the special case , , we strengthen our criterion by showing that only the degree of a single vertex, the “bottom one”, needs to be examined. This generalises a result of Deodhar for type A Schubert varieties. [Copyright &y& Elsevier]
- Published
- 2012
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