中文

Gradient Representations and Affine Structures in AE(n)

高能物理 - 理论 2009-11-11 v2 广义相对论与量子宇宙学

摘要

We study the indefinite Kac-Moody algebras AE(n), arising in the reduction of Einstein's theory from (n+1) space-time dimensions to one (time) dimension, and their distinguished maximal regular subalgebras sl(n) and affine A_{n-2}^{(1)}. The interplay between these two subalgebras is used, for n=3, to determine the commutation relations of the `gradient generators' within AE(3). The low level truncation of the geodesic sigma-model over the coset space AE(n)/K(AE(n)) is shown to map to a suitably truncated version of the SL(n)/SO(n) non-linear sigma-model resulting from the reduction Einstein's equations in (n+1) dimensions to (1+1) dimensions. A further truncation to diagonal solutions can be exploited to define a one-to-one correspondence between such solutions, and null geodesic trajectories on the infinite-dimensional coset space H/K(H), where H is the (extended) Heisenberg group, and K(H) its maximal compact subgroup. We clarify the relation between H and the corresponding subgroup of the Geroch group.

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引用

@article{arxiv.hep-th/0506238,
  title  = {Gradient Representations and Affine Structures in AE(n)},
  author = {Axel Kleinschmidt and Hermann Nicolai},
  journal= {arXiv preprint arXiv:hep-th/0506238},
  year   = {2009}
}

备注

43 pages