English

Lattices, Garside structures and weakly modular graphs

Group Theory 2023-09-08 v4 Combinatorics Geometric Topology

Abstract

In this article we study combinatorial non-positive curvature aspects of various simplicial complexes with natural A~n\widetilde A_n shaped simplicies, including Euclidean buildings of type A~n\widetilde A_n and Cayley graphs of Garside groups and their quotients by the Garside elements. All these examples fit into the more general setting of lattices with order-increasing Z\mathbb Z-actions and the associated lattice quotients proposed in a previous work by the first named author. We show that both the lattice quotients and the lattices themselves give rise to weakly modular graphs, which is a form of combinatorial non-positive curvature. We also show that several other complexes fit into this setting of lattices/lattice quotients, hence our result applies, including Artin complexes of Artin-Tits groups of type A~n\widetilde A_n, a class of arc complexes and weak Garside groups arising from a categorical Garside structure in the sense of Bessis. Along the way, we also clarify the relationship between categorical Garside structure, lattices with Z\mathbb Z action and different classes of complexes studied this article. We use this point of view to describe the first examples of Garside groups with exotic properties, like non-linearity or rigidity results.

Keywords

Cite

@article{arxiv.2211.03257,
  title  = {Lattices, Garside structures and weakly modular graphs},
  author = {Thomas Haettel and Jingyin Huang},
  journal= {arXiv preprint arXiv:2211.03257},
  year   = {2023}
}

Comments

Added section about exotic Garside groups. Updated according to referee's comments. Final accepted version

R2 v1 2026-06-28T05:17:46.519Z