Completely bounded representations of convolution algebras of locally compact quantum groups

Abstract

Given a locally compact quantum group G, we study the structure of completely bounded homomorphisms π:L1( G)→ B(H), and the question of when they are similar to -homomorphisms. By analogy with the cocommutative case (representations of the Fourier algebra A(G)), we are led to consider the associated map π*:L1( G) → B(H) given by π*(ω) = π(ω)*. We show that the corepresentation Vπ of L∞( G) associated to π is invertible if and only if both π and π* are completely bounded. Moreover, we show that the co-efficient operators of such representations give rise to completely bounded multipliers of the dual convolution algebra L1( G). An application of these results is that any (co)isometric corepresentation is automatically unitary. An averaging argument then shows that when G is amenable, π is similar to a *-homomorphism if and only if π* is completely bounded. For compact Kac algebras, and for certain cases of A(G), we show that any completely bounded homomorphism π is similar to a *-homomorphism, without further assumption on π*. Using free product techniques, we construct new examples of compact quantum groups G such that L1( G) admits bounded, but not completely bounded, representations.