Pure Infiniteness of Spectral 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

Let n be a positive integer. We introduce a concept, which we call the n-filling property, for an action of a group on a separable unital C\*-algebra A. If A=C(0) is a commutative unital C\*-algebra and the action is induced by a group of homeomorphisms of 0 then the n-filling property reduces to a

Let K be a skew field and A = K @ A1 @ . . . a graded Kalgebra (both of them not necessarily commutative). We call A homogeneous (or standard) if it is generated by Al as a Kalgebra. A homogeneous Kalgebra A is Koszul if there exists a linear free resolution of the residue field K Y A/A+ as an A-mo