Hopf algebra actions

If A is a p.i. algebra in characteristic zero with action from a finite-dimensional semisimple Hopf algebra H, then A has a nilpotent H-ideal N such that ArN will be H-verbally semiprime. Every H-verbally semiprime algebra is H-p.i. equivalent to a direct sum of H-verbally prime algebras. In the cas

Ž < . the Poincare series P A H . In Section 3 we will compare these three ´k Ž . invariants with the ordinary S -cocharacter, GL k -cocharacter, and n Poincare series. As a result of this comparison we show that the following \* Support by the NSF under Grant DMS 9303230. Work done during the autho

We bring together ideas in analysis on Hopf f-algebra actions on II 1 subfactors of finite Jones index [9,24] and algebraic characterizations of Frobenius, Galois and cleft Hopf extensions [3,13,14] to prove a non-commutative algebraic analogue of the classical theorem: a finite degree field extensi