English

Commutator Subgroups of Singular Braid Groups

Geometric Topology 2019-01-23 v2 Group Theory

Abstract

The singular braids with nn strands, n3n \geq 3, were introduced independently by Baez and Birman. It is known that the monoid formed by the singular braids is embedded in a group that is known as singular braid group, denoted by SGnSG_n. There has been another generalization of braid groups, denoted by GVBnGVB_n, n3n \geq 3, which was introduced by Fang as a group of symmetries behind quantum quasi-shuffle structures. The group GVBnGVB_n simultaneously generalizes the classical braid group, as well as the virtual braid group on nn strands. We investigate the commutator subgroups SGnSG_n' and GVBnGVB_n' of these generalized braid groups. We prove that SGnSG_n' is finitely generated if and only if n5n \ge 5, and GVBnGVB_n' is finitely generated if and only if n4n \ge 4. Further, we show that both SGnSG_n' and GVBnGVB_n' are perfect if and only if n5n \ge 5.

Keywords

Cite

@article{arxiv.1806.05902,
  title  = {Commutator Subgroups of Singular Braid Groups},
  author = {Soumya Dey and Krishnendu Gongopadhyay},
  journal= {arXiv preprint arXiv:1806.05902},
  year   = {2019}
}

Comments

24 pages. Expanded version; singular braid groups added, structural changes done. Comments are welcome

R2 v1 2026-06-23T02:31:07.290Z