中文

Finite complex reflection arrangements are K(pi,1)

几何拓扑 2014-01-24 v5 群论

摘要

Let VV be a finite dimensional complex vector space and W\GL(V)W\subseteq \GL(V) be a finite complex reflection group. Let V\regV^{\reg} be the complement in VV of the reflecting hyperplanes. We prove that V\regV^{\reg} is a K(π,1)K(\pi,1) space. This was predicted by a classical conjecture, originally stated by Brieskorn for complexified real reflection groups. The complexified real case follows from a theorem of Deligne and, after contributions by Nakamura and Orlik-Solomon, only six exceptional cases remained open. In addition to solving this six cases, our approach is applicable to most previously known cases, including complexified real groups for which we obtain a new proof, based on new geometric objects. We also address a number of questions about π1(W\cqV\reg)\pi_1(W\cq V^{\reg}), the braid group of WW. This includes a description of periodic elements in terms of a braid analog of Springer's theory of regular elements.

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引用

@article{arxiv.math/0610777,
  title  = {Finite complex reflection arrangements are K(pi,1)},
  author = {David Bessis},
  journal= {arXiv preprint arXiv:math/0610777},
  year   = {2014}
}

备注

71 pages. v5 minor fixes over v4; v4 contains an entirely rewritten Section 11, a new appendix on Garside theory, and many more improvements (most notably to Section 7). arXiv admin note: text overlap with arXiv:math/0411645