A note on strong similarity and the Connes embedding problem

Abstract

We show that there exists a completely bounded (c.b. in short) homomorphism u from a C*-algebra C with the lifting property (in short LP) into a QWEP von Neumann algebra N that is not strongly similar to a *-homomorphism, i.e. the similarities that ``orthogonalize" u (which exist since u is c.b.) cannot belong to the von Neumann algebra N. Moreover, the map u does not admit any c.b. lifting up into the WEP C*-algebra of which N is a quotient. We can take C=C*(F∞) the full C*-algebra of the free group F∞ with infinitely many generators and N= B(H) M where M is the von Neumann algebra generated by the reduced C*-algebra of F∞. Incidentally we observe an analogue for strong similarity of Haagerup's (and Paulsen's) similarity formula for the cb-norm : if C is any unital C*-algebra and N any von Neumann algebra then for any bounded unital homomorphism u: C N we have \|u\|mb= ∈f\ \|S\|\|S-1\| \ where the inf (which is attained) runs over all invertible S∈ N such that S u(.) S-1 is a *-homomorphism. We end the note by a quick proof of the main point using the mb-norm and the space Rn Cn.