English

Commutator Subgroups of Virtual and Welded Braid Groups

Geometric Topology 2018-02-06 v1 Group Theory

Abstract

Let VBnVB_n, resp. WBnWB_n denote the virtual, resp. welded, braid group on nn strands. We study their commutator subgroups VBn=[VBn,VBn]VB_n' = [VB_n, VB_n] and, WBn=[WBn,WBn]WB_n' = [WB_n, WB_n] respectively. We obtain a set of generators and defining relations for these commutator subgroups. In particular, we prove that VBnVB_n' is finitely generated if and only if n4n \geq 4, and WBnWB_n' is finitely generated for n3n \geq 3. Also we prove that VB3/VB3=Z3Z3Z3ZVB_3'/VB_3'' =\mathbb{Z}_3 \oplus \mathbb{Z}_3 \oplus\mathbb{Z}_3 \oplus \mathbb{Z}^{\infty}, VB4/VB4=Z3Z3Z3VB_4' / VB_4'' = \mathbb{Z}_3 \oplus \mathbb{Z}_3 \oplus \mathbb{Z}_3, WB3/WB3=Z3Z3Z3Z,WB_3'/WB_3'' = \mathbb{Z}_3 \oplus \mathbb{Z}_3 \oplus\mathbb{Z}_3 \oplus \mathbb{Z}, WB4/WB4=Z3,WB_4'/WB_4'' = \mathbb{Z}_3, and for n5n \geq 5 the commutator subgroups VBnVB_n' and WBnWB_n' are perfect, i.e. the commutator subgroup is equal to the second commutator subgroup.

Keywords

Cite

@article{arxiv.1802.01383,
  title  = {Commutator Subgroups of Virtual and Welded Braid Groups},
  author = {Valeriy G. Bardakov and Krishnendu Gongopadhyay and Mikhail V. Neshchadim},
  journal= {arXiv preprint arXiv:1802.01383},
  year   = {2018}
}

Comments

24 pages

R2 v1 2026-06-23T00:11:03.548Z