A space level light bulb theorem in all dimensions

Abstract

Given a d-dimensional manifold M and a knotted sphere sk-1∂ M with 1≤ k≤ d, for which there exists a framed dual sphere Gd-k∂ M, we show that the space of neat embeddings Dk M with boundary s can be delooped by the space of neatly embedded (k-1)-disks, with a normal vector field, in the d-manifold obtained from M by attaching a handle to G. This increase in codimension significantly simplifies the homotopy type of such embedding spaces, and is of interest also in low-dimensional topology. In particular, we apply the work of Dax to describe the first interesting homotopy group of these embedding spaces, in degree d-2k. In a separate paper we use this to give a complete isotopy classification of 2-disks in a 4-manifold with such a boundary dual.