nLab arrangement of hyperplanes

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Idea

An arrangement of hyperplanes is a finite set of hyperplanes in a (finite-dimensional) linear, affine or projective space. Usually (such as for configuration spaces of points) one studies in fact the complement of the union of the hyperplanes, and its topological and other properties. This space is the basis of many interesting fiber bundles appearing in conformal field theory, study of hypergeometric functions (Aomoto, Gelfand, Varchenko), quantum groups etc., for more on which see at Knizhnik-Zamolodchikov equation.

References

General

Stanley’s survey focuses instead more on combinatorics of the intersection poset of an arrangement (as well as arrangements in the case of vector space over a finite field):

  • Richard P. Stanley, An introduction to hyperplane arrangements, in: Geometric combinatorics, 389–496, IAS/Park City Math. Ser., 13, Amer. Math. Soc. 2007, pdf, errata

  • Richard Randell, Morse theory, Milnor fibers and minimality of hyperplane arrangements, math.AG/0011101

  • Daniel C. Cohen, Michael Falk, Richard Randell, Discriminantal bundles, arrangement groups, and subdirect products of free groups, arxiv/1008.0417

Relating to configuration spaces of points

See the references on Braid representatioons via twisted de Rham cohomology of configuration spaces

Last revised on July 10, 2024 at 13:18:13. See the history of this page for a list of all contributions to it.