A space level light bulb theorem in all dimensions
Abstract
Given a -dimensional manifold and a knotted sphere with , for which there exists a framed dual sphere , we show that the space of neat embeddings with boundary can be delooped by the space of neatly embedded -disks, with a normal vector field, in the -manifold obtained from by attaching a handle to . 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 . 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.
Cite
@article{arxiv.2105.13032,
title = {A space level light bulb theorem in all dimensions},
author = {Danica Kosanović and Peter Teichner},
journal= {arXiv preprint arXiv:2105.13032},
year = {2025}
}
Comments
37 pages, 12 figures. v2. The initial version has now been split into two parts. This version contains results concerning all dimensions and space level arguments, while a separately submitted paper is about the setting of surfaces in 4-manifolds and involves arguments specific for that case. v3. Version accepted for publication in Comment. Math. Helv