Rigid Indecomposable Modules in Grassmannian Cluster Categories
Abstract
The coordinate ring of the Grassmannian variety of -dimensional subspaces in has a cluster algebra structure with Pl\"ucker relations giving rise to exchange relations. In this paper, we study indecomposable modules of the corresponding Grassmannian cluster categories . Jensen, King, and Su have associated a Kac-Moody root system to and shown that in the finite types, rigid indecomposable modules correspond to roots. In general, the link between the category and the root system remains mysterious and it is an open question whether indecomposables always give roots. In this paper, we provide evidence for this association in the infinite types: we show that every indecomposable rank 2 module corresponds to a root of the associated root system. We also show that indecomposable rank 3 modules in all give rise to roots of . For the rank 3 modules in corresponding to real roots, we show that their underlying profiles are cyclic permutations of a certain canonical one. We also characterize the rank 3 modules in corresponding to imaginary roots. By proving that there are exactly 225 profiles of rigid indecomposable rank 3 modules in we confirm the link between the Grassmannian cluster category and the associated root system in this case. We conjecture that the profile of any rigid indecomposable module in corresponding to a real root is a cyclic permutation of a canonical profile.
Cite
@article{arxiv.2011.09227,
title = {Rigid Indecomposable Modules in Grassmannian Cluster Categories},
author = {Karin Baur and Dusko Bogdanic and Ana Garcia Elsener and Jian-Rong Li},
journal= {arXiv preprint arXiv:2011.09227},
year = {2023}
}
Comments
Proposition 2.10 on the tubularity of a category is added. An appendix about induction and restriction techniques is added