On embeddability of joins and their `factors'

Abstract

We present a short and clear proof of the following particular case of a 2006 result of Melikhov-Schepin: Let K be a k-dimensional simplicial complex and K*[3] the union of three cones over K along their common bases. If 2d3k+3 and K*[3] embeds into Rd+2, then K embeds into Rd. We also present a generalization of this theorem. The proofs are based on the Haefliger-Weber `configuration spaces' embeddability criterion, equivariant suspension theorem and simple properties of joins and cones.