中文

The ring structure for equivariant twisted K-theory

K理论与同调 2009-03-23 v3 高能物理 - 理论 数学物理 代数拓扑 微分几何 math.MP 算子代数

摘要

We prove, under some mild conditions, that the equivariant twisted K-theory group of a crossed module admits a ring structure if the twisting 2-cocycle is 2-multiplicative. We also give an explicit construction of the transgression map T1:H(Γ;A)H1((NΓ;A)T_1: H^*(\Gamma;A) \to H^{*-1}((N\rtimes \Gamma;A) for any crossed module NΓN\to \Gamma and prove that any element in the image is \infty-multiplicative. As a consequence, we prove that, under some mild conditions, for a crossed module N\gmN \to \gm and any eZˇ3(Γ;S1)e \in \check{Z}^3(\Gamma;S^1), that the equivariant twisted K-theory group Ke,Γ(N)K^*_{e,\Gamma}(N) admits a ring structure. As an application, we prove that for a compact, connected and simply connected Lie group G, the equivariant twisted K-theory group K[c],G(G)K_{[c], G}^* (G) is endowed with a canonical ring structure K[c],Gi+d(G)K[c],Gj+d(G)K[c],Gi+j+d(G)K^{i+d}_{[c],G}(G)\otimes K^{j+d}_{[c],G}(G)\to K^{i+j+d}_{[c], G}(G), where d=dimGd=dim G and [c]H2(GG;S1)[c]\in H^2(G\rtimes G;S^1).

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引用

@article{arxiv.math/0604160,
  title  = {The ring structure for equivariant twisted K-theory},
  author = {Jean-Louis Tu and Ping Xu},
  journal= {arXiv preprint arXiv:math/0604160},
  year   = {2009}
}

备注

47 pages. To appear in Crelle