τ-Cluster morphism categories and picture groups
From MaRDI portal
Publication:5860664
DOI10.1080/00927872.2021.1921184OpenAlexW3168601404MaRDI QIDQ5860664
Publication date: 22 November 2021
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1809.08989
\(\tau\)-tilting theoryNakayama algebrasCAT(0) cube complexeswide subcategoriessimple minded collections
Related Items
Mutating signed -exceptional sequences, -PERPENDICULAR WIDE SUBCATEGORIES, Morphisms and extensions between bricks over preprojective algebras of type A, A uniqueness property of \(\tau\)-exceptional sequences, Pairwise compatibility for 2-simple minded collections. II: Preprojective algebras and semibrick pairs of full rank
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- \(c\)-vectors via \(\tau\)-tilting theory
- The greedy basis equals the theta basis: A rank two haiku
- On maximal Green sequences in abelian length categories
- Almost split sequences in subcategories
- On sign-coherence of \(c\)-vectors
- Pairwise compatibility for 2-simple minded collections
- Picture groups and maximal Green sequences
- A combinatorial approach to scattering diagrams
- \( \tau \)-tilting finite gentle algebras are representation-finite
- Wall and chamber structure for finite-dimensional algebras
- Minimal inclusions of torsion classes
- Silting objects, simple-minded collections, \(t\)-structures and co-\(t\)-structures for finite-dimensional algebras.
- Reduction of τ-Tilting Modules and Torsion Pairs
- Canonical bases for cluster algebras
- On bounds of homological dimensions in Nakayama algebras
- Scattering diagrams, Hall algebras and stability conditions
- The φ-dimension of cyclic Nakayama algebras
- A Category of Wide Subcategories
- Semibricks
- ORIENTED FLIP GRAPHS, NONCROSSING TREE PARTITIONS, AND REPRESENTATION THEORY OF TILING ALGEBRAS
- $\boldsymbol{\tau}$ -Tilting Finite Algebras, Bricks, and $\boldsymbol{g}$-Vectors
- -tilting theory
- Lattice structure of torsion classes for path algebras
- The classification of \(\tau\)-tilting modules over Nakayama algebras
