English

Maximal almost rigid modules over gentle algebras

Representation Theory 2024-09-02 v1 Combinatorics

Abstract

We study maximal almost rigid modules over a gentle algebra AA. We prove that the number of indecomposable direct summands of every maximal almost rigid AA-module is equal to the sum of the number of vertices and the number of arrows of the Gabriel quiver of AA. Moreover, the algebra AA, considered as an AA-module, can be completed to a maximal almost rigid module in a unique way. Gentle algebras are precisely the tiling algebras of surfaces with marked points. We show that the (permissible) triangulations of the surface of AA are in bijection with the maximal almost rigid AA-modules. Furthermore, we study the endomorphism algebra C=EndATC=\text{End}_A T of a maximal almost rigid module TT. We construct a fully faithful functor G ⁣:modAmodAG\colon \text{mod}\,A\to \text{mod}\, \overline{A} into the module category of a bigger gentle algebra A\overline{A} and show that GG maps maximal almost rigid AA-modules to tilting A\overline{A}-modules. In particular, CC and A\overline{A} are derived equivalent and CC is gentle. After giving a geometric realization of the functor GG, we obtain a tiling G(T)G(\mathbf{T}) of the surface of A\overline{A} as the image of the triangulation T\mathbf{T} corresponding to TT. We then show that the tiling algebra of G(T)G(\mathbf{T}) is CC. Moreover, the tiling algebra of T\mathbf{T} is obtained algebraically from CC as the tensor algebra with respect to the CC-bimodule ExtC2(DC,C)\text{Ext}_C^2(DC,C), which also is fundamental in cluster-tilting theory.

Keywords

Cite

@article{arxiv.2408.16904,
  title  = {Maximal almost rigid modules over gentle algebras},
  author = {Emily Barnard and Raquel Coelho Simoes and Emily Gunawan and Ralf Schiffler},
  journal= {arXiv preprint arXiv:2408.16904},
  year   = {2024}
}

Comments

50 pages, 35 figures. Comments are welcome!

R2 v1 2026-06-28T18:28:14.726Z