English

The trace embedding lemma and spinelessness

Geometric Topology 2020-01-01 v1

Abstract

We demonstrate new applications of the trace embedding lemma to the study of piecewise-linear surfaces and the detection of exotic phenomena in dimension four. We provide infinitely many pairs of homeomorphic 4-manifolds WW and WW' homotopy equivalent to S2S^2 which have smooth structures distinguished by several formal properties: WW' is diffeomorphic to a knot trace but WW is not, WW' contains S2S^2 as a smooth spine but WW does not even contain S2S^2 as a piecewise-linear spine, WW' is geometrically simply connected but WW is not, and WW' does not admit a Stein structure but WW does. In particular, the simple spineless 4-manifolds WW provide an alternative to Levine and Lidman's recent solution to Problem 4.25 in Kirby's list. We also show that all smooth 4-manifolds contain topological locally flat surfaces that cannot be approximated by piecewise-linear surfaces.

Keywords

Cite

@article{arxiv.1912.13021,
  title  = {The trace embedding lemma and spinelessness},
  author = {Kyle Hayden and Lisa Piccirillo},
  journal= {arXiv preprint arXiv:1912.13021},
  year   = {2020}
}

Comments

25 pages, 12 figures

R2 v1 2026-06-23T12:59:09.310Z