Embeddings of non-simply-connected 4-manifolds in 7-space. I. Classification modulo knots

Abstract

We work in the smooth category. Let N be a closed connected orientable 4-manifold with torsion free H1, where Hq:=Hq(N;Z). Our main result is a complete readily calculable classification of embeddings N R7, up to the equivalence relation generated by isotopy and embedded connected sum with embeddings S4 R7. Such a classification was already known only for H1=0 by the work of Bo\'echat, Haefliger and Hudson from 1970. Our classification involves the Bo\'echat-Haefliger invariant (f)∈ H2, Seifert bilinear form λ(f):H3× H3 Z and β-invariant β(f) which assumes values in a quotient of H1 defined by values of (f) and λ(f). In particular, for N=S1× S3 we give a geometrically defined 1-1 correspondence between the set of equivalence classes of embeddings and an explicit quotient of the set Z Z. Our proof is based on development of Kreck modified surgery approach, involving some simpler reformulations, and also uses parametric connected sum.