A geometric classification of the path components of the space of locally stable maps $S^3\to \mathbb{R}^4$

Abstract: Locally stable maps $S^3\to\mathbb{R}^4$ are classified up to homotopy through locally stable maps. The equivalence class of a map $f$ is determined by three invariants: the isotopy class $\sigma(f)$ of its framed singularity link, the generalized normal degree $\nu(f)$, and the algebraic number of cusps $\kappa(f)$ of any extension of $f$ to a locally stable map of the $4$-disk into $\mathbb{R}^5$. Relations between the invariants are described, and it is proved that for any $\sigma$, $\nu$, and $\kappa$ which satisfy these relations, there exists a map $f:S^3\to\mathbb{R}^4$ with $\sigma(f)=\sigma$, $\nu(f)=\nu$, and $\kappa(f)=\kappa$. It follows in particular that every framed link in $S^3$ is the singularity set of some locally stable map into $\mathbb{R}^4$.