On the embeddability of [3]*K

Abstract

We relate the embeddability of the simplicial complex [3]*K into Rn+2 to that of K into Rn. In brief, the embeddability of K into Rn, in the metastable range 2n≥ 3(d+1), is equivalent to the embeddability of [3]*K into Rn+2. We show moreover than the van Kampen obstruction of K vanishes if and only if the van Kampen obstruction of [3]*K vanishes. It follows that for d=2, embeddabilty of [3]*K is equivalent with the vanishing of the van Kampen obstruction for K, but not with the embeddability of K.