Structure Sheaves on Almost Commutative Algebras

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

If \(g_{i}\) is a central sequence of unitaries in a \(\mathrm{I}_{1}\) factor, we show that under certain circumstances \(\lim _{n \rightarrow x_{i}} \operatorname{Ad}\left(\prod_{i=1}^{n} g_{i}\right)\) is an automorphism. Examples come naturally from solutions of the Yang-Baxter equation with a s

Let R be a commutative algebra over a field k. We prove two related results on the simplicity of Lie algebras acting as derivations of R. If D is both a Lie subalgebra and R-submodule of Der k R such that R is D-simple and either char k = 2 or D is not cyclic as an R-module or D R = R, then we show

We describe third power associative multiplications ) on noncentral Lie ideals of prime algebras and skew elements of prime algebras with involution provided w x that x ) y y y ) x s x, y for all x, y and the prime algebras in question do not satisfy polynomial identities of low degree. We also obta

Contents. 0. Introduction. 1. The bundle algebra A. 2. Representation of the bundle algebra A. 3. The dual action and the trace. 4. The local characteristic square extended unitary group and modular automorphism group. 5. Conclusions.