Stratifying systems through \(\tau\)-tilting theory
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Publication:782485
DOI10.25537/dm.2020v25.701-720zbMath1447.18001arXiv1904.11903MaRDI QIDQ782485
Hipolito Treffinger, Octavio Mendoza Hernández
Publication date: 27 July 2020
Published in: Documenta Mathematica (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1904.11903
Torsion theories, radicals (18E40) Representations of quivers and partially ordered sets (16G20) Homological dimension (category-theoretic aspects) (18G20) General module theory in associative algebras (16D10)
Related Items (6)
Mutating signed -exceptional sequences ⋮ The size of a stratifying system can be arbitrarily large ⋮ Morphisms and extensions between bricks over preprojective algebras of type A ⋮ A uniqueness property of \(\tau\)-exceptional sequences ⋮ Mixed standardization and Ringel duality ⋮ Stratifying systems and \(g\)-vectors
Cites Work
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- Stratifying systems over the hereditary path algebra with quiver \(\mathbb {A}_{p,q}\)
- Applications of stratifying systems to the finitistic dimension.
- Tilting categories with applications to stratifying systems.
- An approach to the finitistic dimension conjecture.
- Quasi-hereditary algebras
- Addendum to ``Almost split sequences in subcategories
- Stratifying systems via relative simple modules.
- The category of modules with good filtrations over a quasi-hereditary algebra has almost split sequences
- Wall and chamber structure for finite-dimensional algebras
- Reduction of τ-Tilting Modules and Torsion Pairs
- STRATIFYING SYSTEMS, FILTRATION MULTIPLICITIES AND SYMMETRIC GROUPS
- On Standardly Stratified Algebras
- $\boldsymbol{\tau}$ -Tilting Finite Algebras, Bricks, and $\boldsymbol{g}$-Vectors
- Stratifying systems over hereditary algebras
- -tilting theory
- Stratifying Systems via Relative Projective Modules
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