Projected and near-projected embeddings

Abstract

A stable smooth map f:N M is called "k-realizable" if its composition with the inclusion M⊂ M× Rk is C0-approximable by smooth embeddings; and a "k-prem" if the same composition is C∞-approximable by smooth embeddings, or equivalently if f lifts vertically to a smooth embedding N M× Rk. It is obvious that if f is a k-prem, then it is k-realizable. We refute the long-standing conjecture that the converse is always true. Namely, for each n=4k+3 15 there exists a stable smooth immersion Sn R2n-7 that is 3-realizable but is not a 3-prem. We also prove the converse in a wide range of cases. A k-realizable stable smooth fold map Nn R2n-q is a k-prem if q n and q 2k-3; or if q<n/2 and k=1; or if q∈\2k-1,\,2k-2\ and k∈\2,4,8\ and n is sufficiently large.