English

A Dehornoy-Type Ordering on Plat Presentation Classes

Geometric Topology 2026-04-10 v1

Abstract

For each integer n1n\ge 1, after fixing a proper complexity function on the braid group \B2n\B_{2n}, we use the Dehornoy order to define a strict total order on the set P2n=H2n\\B2n/H2n \mathcal P_{2n}=H_{2n}\backslash \B_{2n}/H_{2n} of 2n2n--plat presentation classes. For a link type L\mathcal L with bridge number b(L)nb(\mathcal L)\le n, this induces a strict total order on the subset P(n)(L)\mathcal P^{(n)}(\mathcal L) corresponding to bridge isotopy classes of nn--bridge positions of L\mathcal L. We also define a distinguished class \CanPlatD(n)(L)\CanPlat_D^{(n)}(\mathcal L) and show that the globally chosen Dehornoy canonical braid agrees with the cosetwise canonical representative of the associated Hilden double coset. As an application, we reformulate the fixed-level bridge finiteness conjecture in terms of boundedness of canonical representatives. This viewpoint supports the role of bridge positions as a structured finite-level model for studying the otherwise vast collection of geometric positions of a link.

Keywords

Cite

@article{arxiv.2604.07790,
  title  = {A Dehornoy-Type Ordering on Plat Presentation Classes},
  author = {Makoto Ozawa},
  journal= {arXiv preprint arXiv:2604.07790},
  year   = {2026}
}
R2 v1 2026-07-01T12:00:31.311Z