Algebraic links and the hopf fibration

A quadratic Jordan pair is constructed from a ‫-ޚ‬graded Hopf algebra having divided power sequences over all primitive elements and with three terms in the ‫-ޚ‬grading of the primitive elements. The notion of a divided power representation of a Jordan pair is introduced and the universal object is

The modularity of a ribbon Hopf algebra is characterized by the Drinfeld map. Ž An elementary approach to Etingof and Gelaki's 1998, Math. Res. Lett. 5, . 119᎐197 result on the dimensions of irreducible modules is given by deducing the Ž . necessary identities involving the matrix S from the well-k

We generalize the notion of the rank-generating function of a graded poset. Namely, by enumerating different chains in a poset, we can assign a quasi-symmetric function to the poset. This map is a Hopf algebra homomorphism between the reduced incidence Hopf algebra of posets and the Hopf algebra of