Simplicial and Crossed Resolutions of Commutative Algebras

We determine the commutant algebra of W in the m-fold tensor product of its n natural representation in the case m F n. For m ) n, we show that the commutant algebra is of finite dimension by introducing a new kind of harmonic polynomial.

## Dedicated to A. Uhhnann i n h o r a o e c r of his eixtkth birthday and a. La8m.e~ in hollour of hi8 fiftieth birthday By E. SOHOLZ and W. TIMMEBMANN of Dresden

We show that, for any irrational rotational algebra A % , A % O 2 $O 2 . This is proved by combining recently established results for C\*-algebras of real rank zero with the following result: For any =>0, there is $>0, such that for any pair of unitaries u, v in any purely infinite simple C\*-algeb

Recall that there are several versions of the Toda equation in sl

Many rings that have enjoyed growing interest in recent years, e.g., quantum enveloping algebras, quantum matrices, certain Witten-algebras, . . . , can be presented as generalized Weyl algebras. In the paper we develop techniques for calculating dimensions, here mainly the Krull dimension in the se