Blattner–Cohen–Montgomery's Duality Theorem for (Weak) Group Smash Products
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Publication:3514771
DOI10.1080/00927870701509495zbMath1153.16039OpenAlexW1985432829MaRDI QIDQ3514771
Bing-Liang Shen, Shuan-Hong Wang
Publication date: 23 July 2008
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00927870701509495
duality theoremsweak Hopf group-coalgebrasweak group smash productsweak relative Hopf group-comodules
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Related Items (4)
A Maschke type theorem for weak relative Hopf \(\pi\)-modules. ⋮ Radford's biproducts for Hopf group-coalgebras and its quasitriangular structures. ⋮ Duality theorem for L-R crossed coproducts ⋮ A Generalized Drinfeld Quantum Double Construction Based on Weak Hopf Algebras
Cites Work
- Frobenius and separable functors for generalized module categories and nonlinear equations
- A duality theorem for Hopf module algebras
- Unifying Hopf modules
- Semi-direct products of Hopf algebras
- An algebraic framework for group duality
- Hopf group-coalgebras
- Yetter-Drinfeld modules for crossed structures.
- Double construction for crossed Hopf coalgebras.
- Weak Hopf algebras. I: Integral theory and \(C^*\)-structure
- Multiplication Modules in Which Every Prime Submodule is Contained in a Unique Maximal Submodule
- Group Twisted Smash Products and Doi–Hopf Modules forT-Coalgebras
- Group Entwining Structures and Group Coalgebra Galois Extensions
- On the structure of relative hopf modules
- Multiplier Hopf Algebras
- A duality theorem for hope module algebras over dedekind rings
- Morita Contexts, π-Galois Extensions for Hopf π-Coalgebras
- A Categorical Approach to Turaev's Hopf Group-Coalgebras
- Graded Quantum Groups and Quasitriangular Hopf Group-Coalgebras
- Duality and rational modules in Hopf algebras over commutative rings
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