Are Unitarizable Groups Amenable?
Abstract
We give a new formulation of some of our recent results on the following problem: if all uniformly bounded representations on a discrete group G are similar to unitary ones, is the group amenable? In 5, we give a new proof of Haagerup's theorem that, on non-commutative free groups, there are Herz-Schur multipliers that are not coefficients of uniformly bounded representations. We actually prove a refinement of this result involving a generalization of the class of Herz-Schur multipliers, namely the class Md(G) which is formed of all the functions f G C such that there are bounded functions i G B(Hi, Hi-1) (Hi Hilbert) with H0 = C, Hd = C such that f(t1t2... td) = 1(t1) 2(t2)... d(td). ∀ ti∈ G We prove that if G is a non-commutative free group, for any d 1, we have Md(G)= Md+1(G), and hence there are elements of Md(G) which are not coefficients of uniformly bounded representations. In the case d=2, Haagerup's theorem implies that M2(G)= M4(G).
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