Classification of knotted tori

Abstract

For a smooth manifold N denote by Em(N) the set of smooth isotopy classes of smooth embeddings N Rm. A description of the set Em(Sp× Sq) was known only for p=q=0 or for p=0, m q+2 or for 2m 2(p+q)+\p,q\+4. (The description was given in terms of homotopy groups of spheres and of Stiefel manifolds.) For m2p+q+3 we introduce an abelian group structure on Em(Sp× Sq) and describe this group `up to an extension problem'. This result has corollaries which, under stronger dimension restrictions, more explicitly describe Em(Sp× Sq). The proof is based on relations between sets Em(N) for different N and m, in particular, on a recent exact sequence of M. Skopenkov.