Semistable subcategories for tiling algebras
Abstract
Semistable subcategories were introduced in the context of Mumford's GIT and interpreted by King in terms of representation theory of finite dimensional algebras. Ingalls and Thomas later showed that for finite dimensional algebras of Dynkin and affine type, the poset of semistable subcategories is isomorphic to the corresponding poset of noncrossing partitions. We show that semistable subcategories defined by tiling algebras, introduced by Coelho Sim{\~o}es and Parsons, are in bijection with noncrossing tree partitions, introduced by the second author and McConville. Moreover, this bijection defines an isomorphism of the posets on these objects. Our work recovers that of Ingalls and Thomas in Dynkin type .
Cite
@article{arxiv.1806.10091,
title = {Semistable subcategories for tiling algebras},
author = {Monica Garcia and Alexander Garver},
journal= {arXiv preprint arXiv:1806.10091},
year = {2019}
}
Comments
Comments welcome; updated references in v2; in v3, corrections to Lemma 5.1 and Lemma 6.2, updated references