τ-Rigid modules from tilted to cluster-tilted algebras
From MaRDI portal
Publication:4967393
DOI10.1080/00927872.2019.1570232zbMath1471.16024arXiv1608.02418OpenAlexW2922409953MaRDI QIDQ4967393
Publication date: 3 July 2019
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1608.02418
tilting modulescluster-tilted algebrastilted algebrassplit-by-nilpotent extensions\(\tau\)-rigid modules
Module categories in associative algebras (16D90) Representations of quivers and partially ordered sets (16G20) Representations of associative Artinian rings (16G10)
Related Items (2)
Classifying tilting modules over the Auslander algebras of radical square zero Nakayama algebras ⋮ Three results for \(\tau\)-rigid modules
Cites Work
- Unnamed Item
- Unnamed Item
- Induced and coinduced modules over cluster-tilted algebras
- Cluster categories for algebras of global dimension 2 and quivers with potential.
- Cluster-tilted algebras of finite representation type.
- Quivers with relations and cluster tilted algebras.
- Cluster-tilted algebras are Gorenstein and stably Calabi-Yau
- Constructing tilted algebras from cluster-tilted algebras.
- Almost split sequences in subcategories
- Projective dimensions and extensions of modules from tilted to cluster-tilted algebras
- Cluster mutation via quiver representations.
- Tilting theory and cluster combinatorics.
- On triangulated orbit categories
- Cluster algebras I: Foundations
- Cluster algebras via cluster categories with infinite-dimensional morphism spaces
- Cluster-tilted algebras
- Full embeddings of almost split sequences over split-by-nilpotent extensions
- Tilting modules over split-by-nilpotent extensions
- On split-by-nilpotent extensions
- BONGARTZ τ-COMPLEMENTS OVER SPLIT-BY-NILPOTENT EXTENSIONS
- -tilting theory
- Cluster-tilted algebras as trivial extensions
- Quivers with relations arising from clusters (𝐴_{𝑛} case)
This page was built for publication: τ-Rigid modules from tilted to cluster-tilted algebras
