English

On the complexity of braids

Geometric Topology 2021-09-03 v2 Group Theory

Abstract

We define a measure of "complexity" of a braid which is natural with respect to both an algebraic and a geometric point of view. Algebraically, we modify the standard notion of the length of a braid by introducing generators Δ_ij\Delta\_{ij}, which are Garside-like half-twists involving strings ii through jj, and by counting powered generators Δ_ijk\Delta\_{ij}^k as log(k+1)\log(|k|+1) instead of simply k|k|. The geometrical complexity is some natural measure of the amount of distortion of the nn times punctured disk caused by a homeomorphism. Our main result is that the two notions of complexity are comparable. This gives rise to a new combinatorial model for the Teichmueller space of an n+1n+1 times punctured sphere. We also show how to recover a braid from its curve diagram in polynomial time. The key r\^ole in the proofs is played by a technique introduced by Agol, Hass, and Thurston.

Keywords

Cite

@article{arxiv.math/0403177,
  title  = {On the complexity of braids},
  author = {Ivan Dynnikov and Bert Wiest},
  journal= {arXiv preprint arXiv:math/0403177},
  year   = {2021}
}

Comments

Version 2: added section on Teichmueller geometry, removed section on train tracks