Bekka-type amenabilities for unitary corepresentations of locally compact quantum groups
Abstract
In this short note, further to Ng's study, we extend Bekka amenability and weak Bekka amenability to general locally compact quantum groups. We generalize some Ng's results to the general case. In particular, we show that, a locally compact quantum group G is co-amenable if and only if the contra-corepresentation of its fundamental multiplicative unitary WG is Bekka amenable, and G is amenable if and only if its dual quantum group's fundamental multiplicative unitary WG is weakly Bekka amenable.
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