R. N. Karasev, A. Yu. Volovikov
Published 2009-11-23, updated 2010-11-03Version 3
In this paper we study the spaces of $q$-tuples of points in a Euclidean space, without $k$-wise coincidences (configuration-like spaces). A transitive group action by permuting these points is considered, and some new upper bounds on the genus (in the sense of Krasnosel'skii--Schwarz and Clapp--Puppe) for this action are given. Some theorems of Cohen--Lusk type for coincidence points of continuous maps to Euclidean spaces are deduced.
Journal: Algebraic & Geometric Topology, 11, 2011, 1033-1052
On Upper Bounds for the Depth of some Classes of Polyhedra
Cellular complexes and embeddings into Euclidean spaces: Möbius strip, torus, and projective plane
Cohomology of Polychromatic Configuration Spaces of Euclidean Space
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