Locally C∗-equivalent algebras

Let A and B be two unital separable simple nuclear C\*-algebras with tracial topological rank zero. Suppose that both A and B have the local approximation property: for any finite subset F and e > 0, there is a C\*-subalgebra C such that its dimensions of irreducible representations are bounded and

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

Bouchet, A., Recognizing locally equivalent graphs, Discrete Mathematics 114 (1993) 75-86. To locally complement a simple graph Fat one of its vertices u is to replace the subgraph induced by F on n(o)= {w: w is an edge of F} by the complementary subgraph. Graphs related by a sequence of local comp