Quantum DynamicalR-Matrices and Quantum Frobenius Group

We consider a class of Hopf algebras having as an invariant a generalized Cartan matrix. For a Hopf algebra of this kind, we prove that it is finite dimensional if and only if its generalized Cartan matrix is actually a finite Cartan matrix (under some mild hypothesis). These results allow us to cla

Some finiteness conditions for infinite dimensional coalgebras, particularly right or left semiperfect coalgebras, or co-Frobenius Hopf algebras are studied. As well, examples of co-Frobenius Hopf algebras are constructed via a Hopf algebra structure on an Ore extension of a group algebra, and it is

For the quantum function algebras O O M and O O GL , at lth roots of unity q n q n when l is odd, the image under the q-analog of the Frobenius morphism charac-Ž . terizes each prime and primitive ideal uniquely up to automorphisms obtained from row and column multiplication of the standard generat

We construct a functor from a certain category of quantum semigroups to a Ž Ž .. category of quantum groups, which, for example, assigns Fun Mat N to q Ž Ž .. Ž . Fun GL N . Combining with a generalization of the Faddeev᎐ q Reshetikhin᎐Takhtadzhyan construction, we obtain quantum groups with univers