The similarity degree of an operator algebra
Abstract
Let A be a unital operator algebra. Let us assume that every bounded\/ unital homomorphism u \ A B(H) is similar to a contractive\/ one. Let Sim(u) = ∈f\\|S\|\, \|S-1\|\ where the infimum runs over all invertible operators S \ H H such that the ``conjugate'' homomorphism a S-1u(a)S is contractive. Now for all c>1, let (c) = Sim(u) where the supremum runs over all unital homomorphism u\ A B(H) with \|u\| c. Then, there is α 0 such that for some constant K we have: (c) Kcα.≤no (*) ∀ c>1 Moreover, the smallest α for which this holds is an integer, denoted by d(A) (called the similarity degree of A) and (*) still holds for some K when α=d(A). Among the applications of these results, we give new characterizations of proper uniform algebras on one hand, and of nuclear C*-algebras on the other. Moreover, we obtain a characterization of amenable groups which answers (at least partially) a question on group representations going back to a 1950 paper of Dixmier.
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