Compact quantum subgroups and left invariant \(C^*\)-subalgebras of locally compact quantum groups
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Publication:537708
DOI10.1016/j.jfa.2011.03.003zbMath1226.46062arXiv1004.4161OpenAlexW2963655361MaRDI QIDQ537708
Publication date: 20 May 2011
Published in: Journal of Functional Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1004.4161
co-amenabilitygroup \(C^*\)-algebralocally compact quantum groupcompact quantum subgroupleft invariant \(C^*\)-subalgebraopen subgroup
(C^*)-algebras and (W^*)-algebras in relation to group representations (22D25) General theory of (C^*)-algebras (46L05) Quantizations, deformations for selfadjoint operator algebras (46L65)
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- Quantum semigroup compactifications and uniform continuity on locally compact quantum groups
- Complementation of certain subspaces of \(L_{\infty}(G)\) of a locally compact group
- A new characterisation of idempotent states on finite and compact quantum groups
- Amenable discrete quantum groups
- Compact matrix pseudogroups
- On invariant subalgebras of the Fourier-Stieltjes algebra of a locally compact group
- A Schwarz inequality for positive linear maps on C\(^*\)-algebras
- Ideals with bounded approximate identities in Fourier algebras.
- A separation property of positive definite functions on locally compact groups and applications to Fourier algebras
- Theory of operator algebras. II
- A characterization of right coideals of quotient type and its application to classification of Poisson boundaries
- An invitation to quantum groups and duality. From Hopf algebras to multiplicative unitaries and beyond
- duality and subgroups
- Duality and subgroups. II
- Operator algebras. Theory of \(C^*\)-algebras and von Neumann algebras
- A new approach to induction and imprimitivity results
- Translation-invariant function algebras on abelian groups
- The Slice Map Problem for C*-Algebras
- Locally compact quantum groups in the von Neumann algebraic setting
- Amenability and Co-Amenability for Locally Compact Quantum Groups
- A C*-ALGEBRAIC FRAMEWORK FOR QUANTUM GROUPS
- LOCALLY COMPACT QUANTUM GROUPS IN THE UNIVERSAL SETTING
- L'algèbre de Fourier d'un groupe localement compact
- The Strict Topology for Double Centralizer Algebras
- Locally compact quantum groups
