Brestensky, L. G., & Reading, N. (2024). Noncrossing partitions of an annulus. arXiv preprint arXiv:2212.14151v4.
This paper aims to develop planar models for visualizing intervals in the absolute order on affine Coxeter groups of types A and C, extending the existing planar models for finite Coxeter groups.
The authors utilize the concept of projecting a small orbit onto the Coxeter plane, a technique previously used for finite Coxeter groups. They adapt this method to affine Coxeter groups by considering an orbit in the vector space V and projecting it onto the Coxeter plane in the dual space V*.
The planar models presented provide a visual and intuitive way to understand the structure of intervals in the absolute order on affine Coxeter groups of types A and C. The factorization of translations in type eA, inspired by the planar model, offers a new perspective on the work of McCammond and Sulway on lattice completions of these intervals.
This research extends the understanding of noncrossing partitions and their connections to Coxeter groups, providing valuable tools for studying Artin groups and related algebraic structures. The planar models offer a powerful visual aid for researchers in combinatorics and related fields.
The paper focuses on affine Coxeter groups of types A and C. Future research could explore similar planar models for other affine types, such as eD and eB, as indicated by the authors. Additionally, investigating the implications of these models for the representation theory of affine Coxeter groups could be a fruitful avenue for further exploration.
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