Daniel Matei, Alexander I. Suciu
Published 1997-12-16, updated 1998-08-14Version 2
We study the homotopy types of complements of arrangements of n transverse planes in R^4, obtaining a complete classification for n <= 6, and lower bounds for the number of homotopy types in general. Furthermore, we show that the homotopy type of a 2-arrangement in R^4 is not determined by the cohomology ring, thereby answering a question of Ziegler. The invariants that we use are derived from the characteristic varieties of the complement. The nature of these varieties illustrates the difference between real and complex arrangements.
Comments: LaTeX2e, 25 pages with 5 figures. Revised version, to appear in Topology
Journal: Topology 39 (2000), no. 1, 61-88
Cohomology rings and nilpotent quotients of real and complex arrangements
Homotopy type of the complement of an immersion and classification of embeddings of tori
Topology of spaces of knots in dimension 3
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