Hom-configurations in triangulated categories generated by spherical objects
Abstract
Hom- and Riedtmann configurations were studied in the context of stable module categories of selfinjective algebras and a certain orbit category C of the bounded derived category of a Dynkin quiver, which is highly reminiscent of the cluster category. The category C is (-1)-Calabi-Yau. Holm and Jorgensen introduced a family of triangulated categories generated by -spherical objects. When , these may be regarded as higher cluster categories of type A infinity. When , they are higher analogues of the orbit category C. In this paper, we classify the (higher) Hom- and Riedtmann configurations for these categories, and link them with noncrossing partitions in the case . Along the way, we obtain a new geometric model for the higher versions of the orbit category C.
Cite
@article{arxiv.1312.4769,
title = {Hom-configurations in triangulated categories generated by spherical objects},
author = {Raquel Coelho Simoes},
journal= {arXiv preprint arXiv:1312.4769},
year = {2013}
}
Comments
17 pages, 4 figures