Yoneda algebras and their singularity categories. Issue 6 (11th May 2022)
- Record Type:
- Journal Article
- Title:
- Yoneda algebras and their singularity categories. Issue 6 (11th May 2022)
- Main Title:
- Yoneda algebras and their singularity categories
- Authors:
- Hanihara, Norihiro
- Abstract:
- Abstract: For a finite dimensional algebra Λ $\Lambda$ of finite representation type and an additive generator M $M$ for mod Λ $\operatorname{mod}\Lambda$, we investigate the properties of the Yoneda algebra Γ = ⨁ i ⩾ 0 Ext Λ i ( M, M ) $\Gamma =\bigoplus _{i \geqslant 0}\operatorname{Ext}_\Lambda ^i(M, M)$ . We show that Γ $\Gamma$ is graded coherent and Gorenstein of self‐injective dimension at most 1, and the graded singularity category D sg Z ( Γ ) $\mathrm{D_{sg}^\mathbb {Z}}(\Gamma )$ of Γ $\Gamma$ is triangle equivalent to the derived category of the stable Auslander algebra of Λ $\Lambda$ . These results remain valid for representation‐infinite algebras. For this we introduce the Yoneda category Y $\mathcal {Y}$ of Λ $\Lambda$ as the additive closure of the shifts of the Λ $\Lambda$ ‐modules in the derived category D b ( mod Λ ) $\mathrm{D^b}(\operatorname{mod}\Lambda )$ . We show that Y $\mathcal {Y}$ is coherent and Gorenstein of self‐injective dimension at most 1, and the singularity category of Y $\mathcal {Y}$ is triangle equivalent to the derived category D b ( mod ( mod ̲ Λ ) ) $\mathrm{D^b}(\operatorname{mod}(\operatorname{\underline{\operatorname{mod}}}\Lambda ))$ of the stable category mod ̲ Λ $\operatorname{\underline{\operatorname{mod}}}\Lambda$ . To give a triangle equivalence, we apply the theory of realization functors. We show that any algebraic triangulated category has an f‐category over itself by formulating the filtered derived category of a DGAbstract: For a finite dimensional algebra Λ $\Lambda$ of finite representation type and an additive generator M $M$ for mod Λ $\operatorname{mod}\Lambda$, we investigate the properties of the Yoneda algebra Γ = ⨁ i ⩾ 0 Ext Λ i ( M, M ) $\Gamma =\bigoplus _{i \geqslant 0}\operatorname{Ext}_\Lambda ^i(M, M)$ . We show that Γ $\Gamma$ is graded coherent and Gorenstein of self‐injective dimension at most 1, and the graded singularity category D sg Z ( Γ ) $\mathrm{D_{sg}^\mathbb {Z}}(\Gamma )$ of Γ $\Gamma$ is triangle equivalent to the derived category of the stable Auslander algebra of Λ $\Lambda$ . These results remain valid for representation‐infinite algebras. For this we introduce the Yoneda category Y $\mathcal {Y}$ of Λ $\Lambda$ as the additive closure of the shifts of the Λ $\Lambda$ ‐modules in the derived category D b ( mod Λ ) $\mathrm{D^b}(\operatorname{mod}\Lambda )$ . We show that Y $\mathcal {Y}$ is coherent and Gorenstein of self‐injective dimension at most 1, and the singularity category of Y $\mathcal {Y}$ is triangle equivalent to the derived category D b ( mod ( mod ̲ Λ ) ) $\mathrm{D^b}(\operatorname{mod}(\operatorname{\underline{\operatorname{mod}}}\Lambda ))$ of the stable category mod ̲ Λ $\operatorname{\underline{\operatorname{mod}}}\Lambda$ . To give a triangle equivalence, we apply the theory of realization functors. We show that any algebraic triangulated category has an f‐category over itself by formulating the filtered derived category of a DG category, which assures the existence of a realization functor. … (more)
- Is Part Of:
- Proceedings of the London Mathematical Society. Volume 124:Issue 6(2022)
- Journal:
- Proceedings of the London Mathematical Society
- Issue:
- Volume 124:Issue 6(2022)
- Issue Display:
- Volume 124, Issue 6 (2022)
- Year:
- 2022
- Volume:
- 124
- Issue:
- 6
- Issue Sort Value:
- 2022-0124-0006-0000
- Page Start:
- 854
- Page End:
- 898
- Publication Date:
- 2022-05-11
- Subjects:
- Mathematics -- Periodicals
Mathematics
Periodicals
510 - Journal URLs:
- http://catalog.hathitrust.org/api/volumes/oclc/1606055.html ↗
http://journals.cambridge.org/jid_PLM ↗
http://plms.oxfordjournals.org/content/by/year ↗
http://ukcatalogue.oup.com/ ↗
http://firstsearch.oclc.org ↗
http://firstsearch.oclc.org/journal=0024-6115;screen=info;ECOIP ↗ - DOI:
- 10.1112/plms.12441 ↗
- Languages:
- English
- ISSNs:
- 0024-6115
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 6751.000000
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 21777.xml