∗-Regularity and uniqueness of C∗-norm for tensor products of ∗-algebras

Given two lmc C\*-algebras E, F denote by v, x the projective resp. injective tensorial lmc C\*-topology on E 6 F [lo]. Then, E 5 x 5 v 5 a, where E, a the projective resp. biprojective tensorial topology on E 8 F. If now, F is commutative and A ( F ) denotes the GEL'FAND space of F, one obtains und

Combining a construction of Dadarlat of a unital, simple, non-exact C\*-algebra C of real rank zero and stable rank one, which is shape equivalent to a UHFalgebra, with results of Kirchberg and a result obtained by Dadarlat and the firstnamed author, we show that B(H) C contains an ideal that is not

## Abstract Analytic operator valued functions of two operators on tensor products of Hilbert spaces are considered. A precise norm estimate is established. Applications to operator differential equations are also discussed. (© 2008 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

We give a new and shorter proof of the associativity of tensor product for modules for rational vertex operator algebras under certain convergence conditions.