Embeddability of joins and products of polyhedra
Abstract
We present a short proof of S. Parsa's theorem that there exists a compact n-polyhedron P, n 2, non-embeddable in R2n, such that P*P embeds in R4n+2. This proof can serve as a showcase for the use of geometric cohomology. We also show that a compact n-polyhedron X embeds in Rm, m3(n+1)2, if either - X*K embeds in Rm+2k, where K is the (k-1)-skeleton of the 2k-simplex; or - X*L embeds in Rm+2k, where L is the join of k copies of the 3-point set; or - X is acyclic and X×(triod)k embeds in Rm+2k.
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