The classification of certain linked 3-manifolds in 6-space

Abstract

We work entirely in the smooth category. An embedding f:(S2× S1) S3→ R6 is Brunnian, if the restriction of f to each component is isotopic to the standard embedding. For each triple of integers k,m,n such that m n 2, we explicitly construct a Brunnian embedding fk,m,n:(S2× S1) S3 → R6 such that the following theorem holds. Theorem: Any Brunnian embedding f:(S2× S1) S3→ R6 is isotopic to fk,m,n for some integers k,m,n such that m n 2. Two embeddings fk,m,n and fk',m',n' are isotopic if and only if k=k', m m' 2k and n n' 2k. We use Haefliger's classification of embeddings S3 S3→ R6 in our proof. The following corollary shows that the relation between the embeddings (S2× S1) S3→ R6 and S3 S3→ R6 is not trivial. Corollary: There exist embeddings f:(S2× S1) S3→ R6 and g,g':S3 S3→ R6 such that the componentwise embedded connected sum f\#g is isotopic to f\#g' but g is not isotopic to g'.