A geometric classification of the path components of the space of locally stable maps S3 R4

Abstract

Locally stable maps S34 are classified up to homotopy through locally stable maps. The equivalence class of a map f is determined by three invariants: the isotopy class σ(f) of its framed singularity link, the generalized normal degree (f), and the algebraic number of cusps (f) of any extension of f to a locally stable map of the 4-disk into R5. Relations between the invariants are described, and it is proved that for any σ, , and which satisfy these relations, there exists a map f:S34 with σ(f)=σ, (f)=, and (f)=. It follows in particular that every framed link in S3 is the singularity set of some locally stable map into R4.