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The Haagerup property for locally compact quantum groups

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.
Publication status:
Published
Peer review status:
Peer reviewed

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Publisher copy:
10.1515/crelle-2013-0113

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Institution:
University of Oxford
Division:
MPLS Division
Department:
Mathematical Institute
Oxford college:
St John's College
Role:
Author
ORCID:
0000-0003-2264-8943


Publisher:
De Gruyter
Journal:
Journal für die reine und angewandte Mathematik More from this journal
Publication date:
2014-01-10
DOI:
EISSN:
1435-5345
ISSN:
0075-4102


Keywords:
Pubs id:
pubs:1049972
UUID:
uuid:4d62ecd4-5507-44e2-8dab-d884d501bfb8
Local pid:
pubs:1049972
Source identifiers:
1049972
Deposit date:
2019-09-07
ARK identifier:

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