中文

A Borel-Weil Theorem for Schur Modules

alg-geom 2015-06-30 v1 代数几何

摘要

We present a generalization of the classical Schur modules of GL(N)GL(N) exhibiting the same interplay among algebra, geometry, and combinatorics. A generalized Young diagram DD is an arbitrary finite subset of \NN×\NN\NN \times \NN. For each DD, we define the Schur module SDS_D of GL(N)GL(N). We introduce a projective variety \FFD\FF_D and a line bundle \LLD\LL_D, and describe the Schur module in terms of sections of \LLD\LL_D. For diagrams with the ``northeast'' property, (i1,j1), (i2,j2)D(min(i1,i2),max(j1,j2))D,(i_1,j_1),\ (i_2, j_2) \in D \to (\min(i_1,i_2),\max(j_1,j_2)) \in D , which includes the skew diagrams, we resolve the singularities of \FD\FD and show analogs of Bott's and Kempf's vanishing theorems. Finally, we apply the Atiyah-Bott Fixed Point Theorem to establish a Weyl-type character formula of the form: \CharSD(x)=tx\wt(t)i,j(1xixj1)dij(t) , {\Char}_{S_D}(x) = \sum_t {x^{\wt(t)} \over \prod_{i,j} (1-x_i x_j^{-1})^{d_{ij}(t)}} \ , where tt runs over certain standard tableaux of DD. Our results are valid over fields of arbitrary characteristic.

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引用

@article{arxiv.alg-geom/9411014,
  title  = {A Borel-Weil Theorem for Schur Modules},
  author = {Peter Magyar},
  journal= {arXiv preprint arXiv:alg-geom/9411014},
  year   = {2015}
}

备注

35pp, LaTeX