中文

On the Gribov Problem for Generalized Connections

数学物理 2009-10-31 v2 高能物理 - 理论 math.MP

摘要

The bundle structure of the space \Ab\Ab of Ashtekar's generalized connections is investigated in the compact case. It is proven that every stratum is a locally trivial fibre bundle. The only stratum being a principal fibre bundle is the generic stratum. Its structure group equals the space \Gb\Gb of all generalized gauge transforms modulo the constant center-valued gauge transforms. For abelian gauge theories the generic stratum is globally trivial and equals the total space \Ab\Ab. However, for a certain class of non-abelian gauge theories -- e.g., all SU(N) theories -- the generic stratum is nontrivial. This means, there are no global gauge fixings -- the so-called Gribov problem. Nevertheless, there is a covering of the generic stratum by trivializations each having total induced Haar measure 1.

引用

@article{arxiv.math-ph/0007001,
  title  = {On the Gribov Problem for Generalized Connections},
  author = {Christian Fleischhack},
  journal= {arXiv preprint arXiv:math-ph/0007001},
  year   = {2009}
}

备注

38 pages, LaTeX, v2: main results unchanged, but article widely restructured; extended introduction; new sect. 7.1 and app. F (replacing former sect. 7); new discussion; new prop. C.1 + G.1; refs. added