English

Monic monomial representations I Gorenstein-projective modules

Representation Theory 2016-02-23 v3

Abstract

For a kk-algebra AA, a quiver QQ, and an ideal II of kQkQ generated by monomial relations, let Λ:=AkkQ/I\Lambda: = A\otimes_k kQ/I. We introduce the monic representations of (Q,I)(Q, I) over AA. We give properties of the structural maps of monic representations, and prove that the category mon(Q,I,A){\rm mon}(Q, I, A) of the monic representations of (Q,I)(Q, I) over AA is a resolving subcategory of rep(Q,I,A){\rm rep}(Q, I, A). We introduce the condition (G){\rm(G)}. The main result claims that a \m\m-module is Gorenstein-projective if and only if it is a monic module satisfying (G){\rm(G)}. As consequences, the monic \m\m-modules are exactly the projective \m\m-modules if and only if AA is semisimple; and they are exactly the Gorenstein-projective \m\m-modules if and only if AA is selfinjective, and if and only if mon(Q,I,A){\rm mon}(Q, I, A) is Frobenius.

Keywords

Cite

@article{arxiv.1510.05124,
  title  = {Monic monomial representations I Gorenstein-projective modules},
  author = {Xiu-Hua Luo and Pu Zhang},
  journal= {arXiv preprint arXiv:1510.05124},
  year   = {2016}
}
R2 v1 2026-06-22T11:22:46.632Z