Introduces uniformly recurrent subalgebras (URAs) and proves they characterize C*-simplicity of groups via amenable crossed products while allowing arbitrary topological complexity.
The Haagerup property for locally compact quantum groups
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abstract
The Haagerup property for locally compact groups is generalised to the context of locally compact quantum groups, with several equivalent characterisations in terms of the unitary representations and positive-definite functions established. In particular it is shown that a locally compact quantum group G has the Haagerup property if and only if its mixing representations are dense in the space of all unitary representations. For discrete G we characterise the Haagerup property by the existence of a symmetric proper conditionally negative functional on the dual quantum group $\hat{G}$; by the existence of a real proper cocycle on G, and further, if G is also unimodular we show that the Haagerup property is a von Neumann property of G. This extends results of Akemann, Walter, Bekka, Cherix, Valette, and Jolissaint to the quantum setting and provides a connection to the recent work of Brannan. We use these characterisations to show that the Haagerup property is preserved under free products of discrete quantum groups.
fields
math.OA 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Uniformly recurrent subalgebras in finite von Neumann algebras
Introduces uniformly recurrent subalgebras (URAs) and proves they characterize C*-simplicity of groups via amenable crossed products while allowing arbitrary topological complexity.