English

Spin structures and codimension-two homeomorphism extensions

Geometric Topology 2010-09-21 v2

Abstract

Let ı:M\RRp+2\imath: M\to \RR^{p+2} be a smooth embedding from a connected, oriented, closed pp-dimesional smooth manifold to \RRp+2\RR^{p+2}, then there is a spin structure ı(ςp+2)\imath^\sharp(\varsigma^{p+2}) on MM canonically induced from the embedding. If an orientation-preserving diffeomorphism τ\tau of MM extends over ı\imath as an orientation-preserving topological homeomorphism of \RRp+2\RR^{p+2}, then τ\tau preserves the induced spin structure. Let \esg\cat(ı)\esg_\cat(\imath) be the subgroup of the \cat\cat-mapping class group \mcg\cat(M)\mcg_\cat(M) consisting of elements whose representatives extend over \RRp+2\RR^{p+2} as orientation-preserving \cat\cat-homeomorphisms, where \cat=\topo\cat=\topo, \pl\pl or \diff\diff. The invariance of ı(ςp+2)\imath^\sharp(\varsigma^{p+2}) gives nontrivial lower bounds to [\mcg\cat(M):\esg\cat(ı)][\mcg_\cat(M):\esg_\cat(\imath)] in various special cases. We apply this to embedded surfaces in \RR4\RR^4 and embedded pp-dimensional tori in \RRp+2\RR^{p+2}. In particular, in these cases the index lower bounds for \esg\topo(ı)\esg_\topo(\imath) are achieved for unknotted embeddings.

Keywords

Cite

@article{arxiv.0910.4949,
  title  = {Spin structures and codimension-two homeomorphism extensions},
  author = {Fan Ding and Yi Liu and Shicheng Wang and Jiangang Yao},
  journal= {arXiv preprint arXiv:0910.4949},
  year   = {2010}
}

Comments

14 pages, 1 figure

R2 v1 2026-06-21T14:03:28.550Z