Nichols algebra is a particular graded braided Hopf algebra attached to a Yetter–Drinfeld module over a Hopf algebra or, more generally, a braided vector space.
They play a major role in a program of classification of pointed Hopf algebras. The quantum analogue of the unipotent part of the Borel subalgebra of the universal enveloping algebra as defined by Lusztig and Rosso can be constructed as an example.
It is introduced in
Braided symmetrizers for a given braiding used in the construction are due
Surveys
Role in the lifting program in classification
N. Andruskiewitsch, H.-J. Schneider, Lifting of quantum linear spaces and pointed Hopf algebras of order , doi
N. Andruskiewitsch, H.-J. Schneider, Finite quantum groups and Cartan matrices, Adv. Math. 154 (2000), 1–45
N. Andruskiewitsch, H.-J. Schneider, Pointed Hopf algebras, MSRI Publ. 43 (2002), 1–68.
Nicolás Andruskiewitsch, István Heckenberger, Hans-Jürgen Schneider, The Nichols algebra of a semisimple Yetter–Drinfeld module, American J. of Math. 132:6, (2010) 1493–1547 doi
I. Heckenberger, H.-J. Schneider, Root systems and Weyl groupoids for Nichols algebras, Proc. Lond. Math. Soc., 101 (2010) 623–654
I. Heckenberger, L. Vendramin, A classification of Nichols algebras of semi-simple Yetter-Drinfeld modules over non-abelian groups, J. Eur. Math. Soc. 19 (2) (2014) doi
Appearance in conformal field theory,
Other articles
Last revised on October 20, 2024 at 18:40:33. See the history of this page for a list of all contributions to it.