中文

Averages over classical compact Lie groups and Weyl characters

表示论 2010-10-01 v2 组合数学

摘要

We compute EG(i\tr(gλi))E_G (\prod_i \tr(g^{\lambda_i})), where G=Sp(2n)G=Sp(2n) or SO(m)(m=2n,2n+1)SO(m) (m=2n, 2n+1) with Haar measure. This was first obtained by Persi Diaconis and Mehrdad Shahshahani, but our proof is more self-contained and gives a combinatorial description for the answer. We also consider how averages of general symmetric functions EGfnE_G f_n are affected when we introduce a Weyl character χλG\chi^G_\lambda into the integrand. We show that the value of EGχλGfn/EGfnE_G \chi^G_\lambda f_n / E_G f_n approaches a constant for large nn. More surprisingly, the ratio we obtain only changes with fnf_n and λ\lambda and is independent of the Cartan type of GG. Even in the unitary case, Daniel Bump and Persi Diaconis have obtained the same ratio. Finally, those ratios can be combined with asymptotics for EGfnE_G f_n due to Kurt Johansson and provide asymptotics for EGχλGfnE_G \chi^G_\lambda f_n.

引用

@article{arxiv.math/0504399,
  title  = {Averages over classical compact Lie groups and Weyl characters},
  author = {Paul-Olivier Dehaye},
  journal= {arXiv preprint arXiv:math/0504399},
  year   = {2010}
}

备注

18 pages, slightly changed a definition in the odd orthogonal case, updated the references, version submitted for publication