English

Self-Referential Discs and the Light Bulb Lemma

Geometric Topology 2020-11-10 v2

Abstract

We show how self-referential discs in 4-manifolds lead to the construction of pairs of discs with a common geometrically dual sphere which are homotopic rel \partial, concordant and coincide near their boundaries, yet are not properly isotopic. This occurs in manifolds without 2-torsion in their fundamental group, e.g. the boundary connect sum of S2×D2S^2\times D^2 and S1×B3S^1\times B^3, thereby exhibiting phenomena not seen with spheres. On the other hand we show that two such discs are isotopic rel \partial if the manifold is simply connected. We construct in S2×D2S1×B3S^2\times D^2\natural S^1\times B^3 a properly embedded 3-ball properly homotopic to a z0×B3z_0\times B^3 but not properly isotopic to z0×B3z_0\times B^3.

Keywords

Cite

@article{arxiv.2006.15450,
  title  = {Self-Referential Discs and the Light Bulb Lemma},
  author = {David Gabai},
  journal= {arXiv preprint arXiv:2006.15450},
  year   = {2020}
}
R2 v1 2026-06-23T16:40:21.301Z