English

Rigid modules and Schur roots

Representation Theory 2020-08-27 v2

Abstract

Let CC be a symmetrizable generalized Cartan matrix with symmetrizer DD and orientation Ω\Omega. In previous work we associated an algebra HH to this data, such that the locally free HH-modules behave in many aspects like representations of a hereditary algebra H~\tilde{H} of the corresponding type. We define a Noetherian algebra H^\hat{H} over a power series ring, which provides a direct link between the representation theory of HH and of H~\tilde{H}. We define and study a reduction and a localization functor relating the module categories of these three types of algebras. These are used to show that there are natural bijections between the sets of isoclasses of tilting modules over HH, H^\hat{H} and H~\tilde{H}. We show that the indecomposable rigid locally free modules over HH and H^\hat{H} are parametrized, via their rank vector, by the real Schur roots associated to (C,Ω)(C,\Omega). Moreover, the left finite bricks of HH, in the sense of Asai, are parametrized, via their dimension vector, by the real Schur roots associated to the dual datum (CT,Ω)(C^T,\Omega).

Keywords

Cite

@article{arxiv.1812.09663,
  title  = {Rigid modules and Schur roots},
  author = {Christof Geiß and Bernard Leclerc and Jan Schröer},
  journal= {arXiv preprint arXiv:1812.09663},
  year   = {2020}
}

Comments

36 pages. v2: Small corrections and improvements after referee report. Final version, to appear in Math. Z

R2 v1 2026-06-23T06:54:47.932Z