Pointed Hopf algebras
Abstract
This is a survey on pointed Hopf algebras over algebraically closed fields of characteristic 0. We propose to classify pointed Hopf algebras by first determining the graded Hopf algebra associated to the coradical filtration of . The -coinvariants elements form a braided Hopf algebra in the category of Yetter-Drinfeld modules over the coradical , the group of group-like elements of , and \gr A \simeq R # A_{0}. We call the braiding of the primitive elements of the infinitesimal braiding of . If this braiding is of Cartan type \cite{AS2}, then it is often possible to determine , to show that is generated as an algebra by its primitive elements and finally to compute all deformations or liftings, that is pointed Hopf algebras such that \gr A \simeq R # \ku \Gamma. In the last Chapter, as a concrete illustration of the method, we describe explicitly all finite-dimensional pointed Hopf algebras with abelian group of group-likes and infinitesimal braiding of type (up to some exceptional cases). In other words, we compute all the liftings of type ; this result is our main new contribution in this paper.
Keywords
Cite
@article{arxiv.math/0110136,
title = {Pointed Hopf algebras},
author = {N. Andruskiewitsch and H. -J. Schneider},
journal= {arXiv preprint arXiv:math/0110136},
year = {2007}
}