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Bibliographic Details
Main Author: Mostovoy, Jacob
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2303.10737
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Table of Contents:
  • We study the space $Q_n$ of all configurations of $n$ 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 $n<6$ and describe its homology for $n=6,7$. For arbitrary $n$, we compute its first homology and its Euler characteristic. We use three geometric approaches. On one hand, $Q_n$ is naturally defined as the complement to an arrangement of codimension-2 subtori in a real torus. On the other hand, $Q_n$ is homotopy equivalent to an explicit nonpositively curved cubical complex. Finally, $Q_n$ can also be assembled from no-3-equal manifolds of the real line. We also observe that, up to homotopy, $Q_n$ may be identified with a subspace of the oriented double cover of the moduli space $\overline{\mathcal{M}}_{0,n}(\mathbb{R})$ of stable real rational curves with $n$ marked points. This gives an embedding of $π_1 Q_n$ into the pure cactus group. As a corollary, we see that $π_1 Q_n$ is residually nilpotent.