On immersions and embeddings with trivial normal line bundles

Abstract

Let Z be a smooth compact (n+1)-manifold. We study smooth embeddings and immersions β: M Z of compact or closed n-manifolds M such that the normal line bundle β is trivialized. For a fixed Z, we introduce an equivalence relation between such β's; it is a crossover between pseudo-isotopies and bordisms. We call this equivalence relation `` quasitopy". It comes in two flavors: IMM(Z) and EMB(Z), based on immersions and embeddings into Z, respectively. We prove that the natural map A:EMB(Z) IMM(Z) is injective and admits a right inverse R:IMM(Z) EMB(Z), induced by the resolution of self-intersections. As a result, we get a map B:\; IMM(Z) / A(EMB(Z)) k ∈ [2, n+1] Bn+1-k(Z) whose target is a collection of smooth bordism groups of the space Z and which differentiate between immersions and embeddings.