English

Trace Embeddings from Zero Surgery Homeomorphisms

Geometric Topology 2022-03-29 v1

Abstract

Manolescu and Piccirillo recently initiated a program to construct an exotic S4S^4 or #nCP2\# n \mathbb{CP}^2 by using zero surgery homeomorphisms and Rasmussen's ss-invariant. They find five knots that if any were slice, one could construct an exotic S4S^4 and disprove the Smooth 44-dimensional Poincar\'e conjecture. We rule out this exciting possibility and show that these knots are not slice. To do this, we use a zero surgery homeomorphism to relate slice properties of two knots \textit{stably} after a connected sum with some 44-manifold. Furthermore, we show that our techniques will extend to the entire infinite family of zero surgery homeomorphisms constructed by Manolescu and Piccirillo. However, our methods do not completely rule out the possibility of constructing an exotic S4S^4 or #nCP2\# n \mathbb{CP}^2 as Manolescu and Piccirillo proposed. We explain the limits of these methods hoping this will inform and invite new attempts to construct an exotic S4S^4 or #nCP2\# n \mathbb{CP}^2. We also show a family of homotopy spheres constructed by Manolescu and Piccirillo using annulus twists of a ribbon knot are all standard.

Keywords

Cite

@article{arxiv.2203.14270,
  title  = {Trace Embeddings from Zero Surgery Homeomorphisms},
  author = {Kai Nakamura},
  journal= {arXiv preprint arXiv:2203.14270},
  year   = {2022}
}

Comments

18 pages, 8 figures. Comments welcome!

R2 v1 2026-06-24T10:27:19.989Z