An in-depth look at quotient modules
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Publication:2301664
DOI10.1007/s10468-018-9835-zzbMath1439.16033arXiv1705.06613OpenAlexW2738251621WikidataQ128943156 ScholiaQ128943156MaRDI QIDQ2301664
Publication date: 25 February 2020
Published in: Algebras and Representation Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1705.06613
Module categories in associative algebras (16D90) Group rings of finite groups and their modules (group-theoretic aspects) (20C05) Bimodules in associative algebras (16D20) Closed categories (closed monoidal and Cartesian closed categories, etc.) (18D15) Hopf algebras and their applications (16T05)
Cites Work
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- The depth of subgroups of \(\text{PSL}(2,q)\). II.
- The depth of Young subgroups of symmetric groups.
- Hopf subalgebras and tensor powers of generalized permutation modules.
- The depth of subgroups of \(\mathrm{PSL}(2,q)\).
- Odd \(H\)-depth and \(H\)-separable extensions.
- Algebra depth in tensor categories
- Group algebra extensions of depth one.
- Frobenius algebras. I: Basic representation theory.
- On the depth of subgroups and group algebra extensions.
- Relative projectivity and relative endotrivial modules.
- Subring depth, Frobenius extensions, and towers.
- On the depth 2 condition for group algebra and Hopf algebra extensions.
- Relative Hopf modules - equivalences and freeness criteria
- Bialgebroid actions on depth two extensions and duality.
- A quantum subgroup depth
- Homological properties of quantum permutation algebras
- Algebraic quotient modules and subgroup depth
- McKay centralizer algebras
- Subgroups of odd depth—a necessary condition
- Frobenius induction for algebras
- Subgroups of depth three and more
- Projective Summands in Tensor Products of Simple Modules of Finite Dimensional Hopf Algebras
- The Depth of Subgroups of Suzuki Groups
- Normal Hopf subalgebras of semisimple Hopf algebras
- On modules induced or coinduced from Hopf subalgebras.
- The depth of the maximal subgroups of Ree groups
- On higher Frobenius-Schur indicators
- Subgroup Depth and Twisted Coefficients
- An approach to Hopf algebras via Frobenius coordinates
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