Embeddings of non-simply-connected 4-manifolds in 7-space. II. On the smooth classification

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 readily calculable classification of embeddings N R7 up to isotopy, with an indeterminancy. Such a classification was only known before for H1=0 by our earlier work from 2008. Our classification is complete when H2=0 or when the signature of N is divisible neither by 64 nor by 9. The group of knots S4 R7 acts on the set of embeddings N R7 up to isotopy by embedded connected sum. In Part I we classified the quotient of this action. The main novelty of this paper is the description of this action for H10, with an indeterminancy. Besides the invariants of Part I, detecting the action of knots involves a refinement of the Kreck invariant from our work of 2008. For N=S1× S3 we give a geometrically defined 1--1 correspondence between the set of isotopy classes of embeddings and a certain explicitly defined quotient of the set Z Z Z12.