English

On the difference between real and complex arrangements

alg-geom 2008-02-03 v1 Algebraic Geometry

Abstract

Let BB be an arrangement of linear complex hyperplanes in CdC^d. Then a classical result by Orlik \& Solomon asserts that the cohomology algebra of the complement can be constructed from the combinatorial data that are given by the intersection lattice. If BB' is, more generally, a 22-arrangement in R2dR^{2d} (an arrangement of real subspaces of codimension 22 with even-dimensional intersections), then the intersection lattice still determines the cohomology {\it groups} of the complement, as was shown by Goresky \& MacPherson. We prove, however, that for 22-arrangements the cohomology {\it algebra} is not determined by the intersection lattice. It encodes extra information on sign patterns, which can be computed from determinants of linear relations or, equivalently, from linking coefficients in the sense of knot theory. This also allows us (in the case d=2d=2) to identify arrangements with the same lattice but different fundamental groups.

Keywords

Cite

@article{arxiv.alg-geom/9202005,
  title  = {On the difference between real and complex arrangements},
  author = {Günter M. Ziegler},
  journal= {arXiv preprint arXiv:alg-geom/9202005},
  year   = {2008}
}

Comments

13 pages, plain-TeX, C-Version 3.14