A Maschke type theorem for weak group entwined modules and applications.
From MaRDI portal
Publication:480803
DOI10.1007/s11856-014-1113-0zbMath1317.16030OpenAlexW2133760096MaRDI QIDQ480803
Publication date: 11 December 2014
Published in: Israel Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11856-014-1113-0
integralsentwining structuresMaschke-type theoremsDoi-Hopf modulesrelative Hopf modulesseparable functors
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (4)
The Morita contexts and galois extensions for weak Hopf group coalgebras ⋮ Pivotal weak Turaev \(\pi \)-coalgebras ⋮ Smash coproducts of monoidal comonads and Hom-entwining structures ⋮ Ribbon entwining datum
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Hopf extensions of algebras and Maschke type theorems
- Finite dimensional cosemisimple Hopf algebras in characteristic 0 are semisimple
- Separable functors applied to graded rings
- Separable functors for the category of Doi-Hopf modules, applications
- A Maschke type theorem for Doi-Hopf modules and applications
- Hopf group-coalgebras
- Yetter-Drinfeld modules for crossed structures.
- Double construction for crossed Hopf coalgebras.
- A Maschke type theorem for Hopf \(\pi\)-comodules.
- Group Twisted Smash Products and Doi–Hopf Modules forT-Coalgebras
- Group Entwining Structures and Group Coalgebra Galois Extensions
- Separable functors revisited
- New Braided Crossed Categories and Drinfel'd Quantum Double for Weak Hopf Group Coalgebras
- Semisimple Cosemisimple Hopf Algebras
- Doi-hopf modules over weak hopf algebras
- Homological integral of Hopf algebras
- Morita Contexts, π-Galois Extensions for Hopf π-Coalgebras
- A Categorical Approach to Turaev's Hopf Group-Coalgebras
- An Associative Orthogonal Bilinear Form for Hopf Algebras
This page was built for publication: A Maschke type theorem for weak group entwined modules and applications.
