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Crystals via the affine Grassmannian

代数几何 2007-05-23 v3 表示论

摘要

Let GG be a connected reductive group over \CC\CC and let GG^{\vee} be the Langlands dual group. Crystals for GG^{\vee} were introduced by Kashiwara as certain ``combinatorial skeletons'' of finite-dimensional representations of GG^{\vee}. For every dominant integral weight of GG^{\vee} Kashiwara constructed a canonical crystal. Other (independent) constructions of those crystals were given by Lusztig and Littelmann. It was also shown by Kashiwara and Joseph that the above family of crystals is unique if certain reasonable conditions are imposed. The purpose of this paper is to give another (rather simple) construction of these crystals using the geometry of the affine Grassmannian \calGG=G(\calK)/G(\calO)\calG_G=G(\calK)/G(\calO) of the group GG, where \calK=\CC((t))\calK=\CC((t)) is the field of Laurent power series and \calO=\CC[[t]]\calO=\CC[[t]] is the ring of Taylor series. We check that the crystals we construct satisfy the conditions of the uniqueness theorem mentioned above, which shows that our crystals coincide with those constructed in {\it loc. cit}. It would be interesting to find these isomorphisms directly (cf., however, \cite{Lus3}).

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引用

@article{arxiv.math/9909077,
  title  = {Crystals via the affine Grassmannian},
  author = {Alexander Braverman and Dennis Gaitsgory},
  journal= {arXiv preprint arXiv:math/9909077},
  year   = {2007}
}

备注

10 pages, LaTeX