Van Kampen-Flores theorem for cell complexes
Abstract
The van Kampen-Flores theorem states that the n-skeleton of a (2n+2)-simplex does not embed into R2n. We give two proofs for its generalization to a continuous map from a skeleton of a certain regular CW complex (e.g. a simplicial sphere) into a Euclidean space. We will also generalize Frick and Harrison's result on the chirality of embeddings of the n-skeleton of a (2n+2)-simplex into R2n+1.
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