A classification of smooth embeddings of 4-manifolds in 7-space, II

Abstract

Let N be a closed, connected, smooth 4-manifold with H1(N;Z)=0. Our main result is the following classification of the set E7(N) of smooth embeddings N->R7 up to smooth isotopy. Haefliger proved that the set E7(S4) with the connected sum operation is a group isomorphic to Z12. This group acts on E7(N) by embedded connected sum. Boechat and Haefliger constructed an invariant BH:E7(N)->H2(N;Z) which is injective on the orbit space of this action; they also described im(BH). We determine the orbits of the action: for u in im(BH) the number of elements in BH-1(u) is GCD(u/2,12) if u is divisible by 2, or is GCD(u,3) if u is not divisible by 2. The proof is based on a new approach using modified surgery as developed by Kreck.