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Organizers |
Actions of finite quantum groups on quantum polynomials
by
V. A. Artamonov
Moscow State University
A noncommutative analog of a polynomial algebra over a field k is a quantum polynomial algebra
\Lambda generated by elements
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The aim of this study is a classification of actions of finite quantum groups on Tr×An-r in terms of H-module structure on the algebra \Lambda where H is a finite dimensional pointed Hopf algebra [].
There are some examples of actions of some special pointed finite dimensional Hopf algebras on \Lambda. Namely let U be a subgroup of a finite index in Zn and [k(Zn/U)]* the dual Hopf algebra of the group algebra k(Zn/U) of the finite factorgroup Zn/U. For any f in [k(Zn/U)]* we put f o Xv = f(v+U)Xv for any monomial Xv, where v in Zn is a multi-index. Hopf algebra [k(Zn/U)]* is provided with an involutive automorphism f --> [f\tilde] where [f\tilde](v)=f(-v). So we can form a smash product [k(Zn/U)]*\sharp k<\xi> with the cyclic group <\xi> of order 2. If r=n then the action of [k(Zn/U)]* on \Lambda can be extended to an action of the smash product where \xi o Xv=X-v for all v in Zn. Suppose that qij, 1 <= i < j <= n, are independent in the multiplicative group k* of the field k and H is a pointed finite dimensional Hopf algebra H such that if r=n=2 then dimH is not divisible neither by 4 nor by 3. Let \Lambda be a left H-module algebra. Then there exists a subgroup U in Zn of a finite index and a Hopf algebra homomorphism \Psi: H --> [k(Zn/U)]*\sharp k<\xi> such that the action of H in \Lambda is a product of \Psi and the mentioned action of [k(Zn/U)]*\sharp k<\xi > on \Lambda. If \Psi is not surjective then its image is equal to [k(Zn/U)]*. It is always the case if r < n.
Date received: January 4, 2003
Copyright © 2003 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cake-12.