English

Different exact structures on the monomorphism categories

Representation Theory 2019-10-10 v1

Abstract

Let X\mathcal{X} be a resolving and contravariantly finite subcategory of mod\mboxΛ\rm{mod}\mbox{-}\Lambda, the category of finitely generated right Λ\Lambda-modules. We associate to X\mathcal{X} the subcategory SX(Λ)\mathcal{S}_{\mathcal{X}}(\Lambda) of the morphism category H(Λ)\rm{H}(\Lambda) consisting of all monomorphisms (AfB)(A\stackrel{f}\rightarrow B) with A,BA, B and Cok f\rm{Cok} \ f in X\mathcal{\mathcal{X}}. Since SX(Λ)\mathcal{S}_{\mathcal{X}}(\Lambda) is closed under extensions then it inherits naturally an exact structure from H(Λ)\rm{H}(\Lambda). We will define two other different exact structures else than the canonical one on SX(Λ)\mathcal{S}_{\mathcal{X}}(\Lambda), and the indecomposable projective (resp. injective) objects in the corresponding exact categories completely classified. Enhancing SX(Λ)\mathcal{S}_{\mathcal{X}}(\Lambda) with the new exact structure provides a framework to construct a triangle functor. Let mod\mboxX\rm{mod}\mbox{-}\underline{\mathcal{X}} denote the category of finitely presented functors over the stable category X\underline{\mathcal{X}}. We then use the triangle functor to show a triangle equivalence between the bounded derived category Db(mod\mboxX)\mathbb{D}^{\rm{b}}(\rm{mod}\mbox{-}\underline{\mathcal{X}}) and a Verdier quotient of the bounded derived category of the associated exact category on SX(Λ)\mathcal{S}_{\mathcal{X}}(\Lambda). Similar consideration is also given for the singularity category of mod\mboxX\rm{mod}\mbox{-}\underline{\mathcal{X}}.

Keywords

Cite

@article{arxiv.1910.03403,
  title  = {Different exact structures on the monomorphism categories},
  author = {Rasool Hafezi and Intan Muchtadi-Alamsyah},
  journal= {arXiv preprint arXiv:1910.03403},
  year   = {2019}
}

Comments

37 pages, any comments are welcome. arXiv admin note: text overlap with arXiv:1802.03683 by other authors

R2 v1 2026-06-23T11:37:35.929Z