REPRESENTATIONS OF SIMPLE POINTED HOPF ALGEBRAS
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Publication:5315541
DOI10.1142/S021949880400071XzbMath1080.16043MaRDI QIDQ5315541
Publication date: 8 September 2005
Published in: Journal of Algebra and Its Applications (Search for Journal in Brave)
tensor productsindecomposable modulesfinite representation typepointed Hopf algebrasClebsch-Gordan decompositions
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Related Items (9)
Representations of a non-pointed Hopf algebra ⋮ The Grothendieck rings of Wu–Liu–Ding algebras and their Casimir numbers (I) ⋮ Representation rings of small quantum groups U¯q(sl2) ⋮ Some Hopf algebras related to sl2 ⋮ Green rings of weak Hopf algebras based on generalized Taft algebras ⋮ Grothendieck rings of a class of Hopf algebras of Kac-Paljutkin type ⋮ Representations of pointed Hopf algebras and their Drinfel'd quantum doubles. ⋮ Representations of the small nonstandard quantum groups X¯q(A1) ⋮ The Grothendieck rings of Wu-Liu-Ding algebras and their Casimir numbers (II)
Cites Work
- Pointed Hopf algebras of dimension \(p^3\)
- Pointed Hopf algebras and Kaplansky's 10th conjecture
- Lifting of quantum linear spaces and pointed Hopf algebras of order \(p^3\)
- Hochschild cohomology and the coradical filtration of pointed coalgebras: Applications
- Finite-dimensional simple-pointed Hopf algebras
- On the number of types of finite dimensional Hopf algebras
- A quiver quantum group
- The semisimplicity of smash products of quantum commutative algebras
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