A Skolem-Noether theorem for coalgebra measurings
From MaRDI portal
Publication:807730
DOI10.1007/BF01200036zbMath0731.16026OpenAlexW1972482276MaRDI QIDQ807730
Publication date: 1991
Published in: Archiv der Mathematik (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01200036
bimoduleinner derivationscoradicalcentral simple Artinian algebrafinite-dimensional simple subalgebrainner measuringk-coalgebra measuringsimple subcoalgebraSkolem- Noether theorem
Derivations, actions of Lie algebras (16W25) Simple and semisimple modules, primitive rings and ideals in associative algebras (16D60) Separable algebras (e.g., quaternion algebras, Azumaya algebras, etc.) (16H05)
Related Items
Hopf Galois extensions, triangular structures, and Frobenius Lie algebras in prime characteris\-tic. ⋮ Actions of the dipper-donkin quantizationGL2on the clifford algebraC(l,3) ⋮ A generalization of hopf crossed products ⋮ The Brauer-Clifford group for \((S,H)\)-Azumaya algebras over a commutative ring. ⋮ A Note on Inner Actions of Hopf Algebras ⋮ Hopf Algebras ⋮ Skolem-noether theorems and coalgebra actions ⋮ Actions ofGLq(2,C) onC(1,3) and its four dimensional representations
Cites Work
- Crossed products and Galois extensions of Hopf algebras
- Existence of a unique maximal subcoalgebra whose action is inner
- Coalgebra actions on Azumaya algebras
- On Hopf algebras with cocommutative coradicals
- Locally finite representations
- On automorphisms of separable algebras
- A skolem-noether theorem for hopf algebra actions
- Cohomology of Algebras Over Hopf Algebras
- Simple Algebras With Purely Inseparable Splitting Fields of Exponent 1
- Unnamed Item
- Unnamed Item
