English

Round twin groups on few strands

Group Theory 2025-10-29 v2

Abstract

We study the space QnQ_n of all configurations of nn ordered points on the circle such that no three points coincide, and in which one of the points (say, the last one) is fixed. We compute its fundamental group for n<6n<6 and describe its homology for n=6,7n=6,7. For arbitrary nn, we compute its first homology and its Euler characteristic. We use three geometric approaches. On one hand, QnQ_n is naturally defined as the complement to an arrangement of codimension-2 subtori in a real torus. On the other hand, QnQ_n is homotopy equivalent to an explicit nonpositively curved cubical complex. Finally, QnQ_n can also be assembled from no-3-equal manifolds of the real line. We also observe that, up to homotopy, QnQ_n may be identified with a subspace of the oriented double cover of the moduli space M0,n(R)\overline{\mathcal{M}}_{0,n}(\mathbb{R}) of stable real rational curves with nn marked points. This gives an embedding of π1Qn\pi_1 Q_n into the pure cactus group. As a corollary, we see that π1Qn\pi_1 Q_n is residually nilpotent.

Keywords

Cite

@article{arxiv.2303.10737,
  title  = {Round twin groups on few strands},
  author = {Jacob Mostovoy},
  journal= {arXiv preprint arXiv:2303.10737},
  year   = {2025}
}

Comments

The second version includes the computation of H_1 and the Euler characteristic for all n

R2 v1 2026-06-28T09:23:04.819Z