Harmonic operators on convolution quantum group algebras
Abstract
Let G be a locally compact quantum group and T(L2( G)) be the Banach algebra of trace class operators on L2( G) with the convolution induced by the right fundamental unitary of G. We study the space of harmonic operators Hω in B(L2( G)) associated to a contractive element ω∈ T(L2( G)). We characterize the existence of non-zero harmonic operators in K(L2( G)) and relate them with some properties of the quantum group G, such as finiteness, amenability and co-amenability.
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