Authors: Blagojević, Pavle 
Matschke, Benjamin
Ziegler, Günter
Affiliations: Mathematical Institute of the Serbian Academy of Sciences and Arts 
Title: A tight colored Tverberg theorem for maps to manifolds
Journal: Topology and its Applications
Volume: 158
Issue: 12
First page: 1445
Last page: 1452
Issue Date: 1-Aug-2011
Rank: M23
ISSN: 0166-8641
DOI: 10.1016/j.topol.2011.05.016
Abstract: 
We prove that any continuous map of an N-dimensional simplex ΔN with colored vertices to a d-dimensional manifold M must map r points from disjoint rainbow faces of ΔN to the same point in M: For this we have to assume that N≥(r-1)(d+1), no r vertices of ΔN get the same color, and our proof needs that r is a prime. A face of ΔN is a rainbow face if all vertices have different colors.This result is an extension of our recent "new colored Tverberg theorem", the special case of M=R{double-Struck}d. It is also a generalization of Volovikov's 1996 topological Tverberg theorem for maps to manifolds, which arises when all color classes have size 1 (i.e., without color constraints); for this special case Volovikov's proof, as well as ours, works when r is a prime power.
Keywords: Colored Tverberg problem | Deleted product/join configuration space | Equivariant cohomology | Fadell-Husseini index | Serre spectral sequence
Publisher: Elsevier
Project: European Union’s Seventh Framework Programme (FP7/2007-2013)/ERC, Grant agreement No. 247029-SDModels
Advanced Techniques of Cryptology, Image Processing and Computational Topology for Information Security 

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