Algebraic Structure of Multiparameter Quantum Groups
Identifieur interne : 000505 ( France/Analysis ); précédent : 000504; suivant : 000506Algebraic Structure of Multiparameter Quantum Groups
Auteurs : Timothy J. Hodges ; Thierry Levasseur [France] ; Margarita Toro [Colombie]Source :
- Advances in Mathematics [ 0001-8708 ] ; 1997.
English descriptors
- KwdEn :
- Abelian, Abelian group, Acts transitively, Adjoint, Adjoint action, Algebra, Algebraic, Algebraic case, Algebraic closure, Algebraic group, Algebraic subgroup, Antisymmetric, Antisymmetric bicharacter, Bicharacter, Bigraded, Bijection, Cohomology class, Compact quantum group, Compact quantum groups, Drinfeld, Dual basis, Dual pair, Finite order, Finitely, General case, Hopf, Hopf algebra, Hopf algebras, Hopf pairing, Isomorphism, Isomorphism class, Levasseur, Lop8m, Matrix, Maximal ideals, Maximal torus, Module, Morphism, Page codes, Pairing, Parameter case, Poisson, Prim, Primitive ideals, Primitive spectrum, Quantized, Quantized function algebra, Quantum, Quantum function algebra, Quantum group, Quantum groups, Quantum groups proof, Spec, Subalgebra, Subgroup, Suffices, Symp, Symplectic, Toro, Toro proof, Torus, Weight vectors.
- Teeft :
- Abelian, Abelian group, Acts transitively, Adjoint, Adjoint action, Algebra, Algebraic, Algebraic case, Algebraic closure, Algebraic group, Algebraic subgroup, Antisymmetric, Antisymmetric bicharacter, Bicharacter, Bigraded, Bijection, Cohomology class, Compact quantum group, Compact quantum groups, Drinfeld, Dual basis, Dual pair, Finite order, Finitely, General case, Hopf, Hopf algebra, Hopf algebras, Hopf pairing, Isomorphism, Isomorphism class, Levasseur, Lop8m, Matrix, Maximal ideals, Maximal torus, Module, Morphism, Page codes, Pairing, Parameter case, Poisson, Prim, Primitive ideals, Primitive spectrum, Quantized, Quantized function algebra, Quantum, Quantum function algebra, Quantum group, Quantum groups, Quantum groups proof, Spec, Subalgebra, Subgroup, Suffices, Symp, Symplectic, Toro, Toro proof, Torus, Weight vectors.
Url:
DOI: 10.1006/aima.1996.1612
Affiliations:
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<term>Bijection</term>
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<term>Bijection</term>
<term>Cohomology class</term>
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<term>Compact quantum groups</term>
<term>Drinfeld</term>
<term>Dual basis</term>
<term>Dual pair</term>
<term>Finite order</term>
<term>Finitely</term>
<term>General case</term>
<term>Hopf</term>
<term>Hopf algebra</term>
<term>Hopf algebras</term>
<term>Hopf pairing</term>
<term>Isomorphism</term>
<term>Isomorphism class</term>
<term>Levasseur</term>
<term>Lop8m</term>
<term>Matrix</term>
<term>Maximal ideals</term>
<term>Maximal torus</term>
<term>Module</term>
<term>Morphism</term>
<term>Page codes</term>
<term>Pairing</term>
<term>Parameter case</term>
<term>Poisson</term>
<term>Prim</term>
<term>Primitive ideals</term>
<term>Primitive spectrum</term>
<term>Quantized</term>
<term>Quantized function algebra</term>
<term>Quantum</term>
<term>Quantum function algebra</term>
<term>Quantum group</term>
<term>Quantum groups</term>
<term>Quantum groups proof</term>
<term>Spec</term>
<term>Subalgebra</term>
<term>Subgroup</term>
<term>Suffices</term>
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