On \(C^\ast\)-algebras generated by isometries with twisted commutation relations
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Publication:1948128
DOI10.1016/J.JFA.2013.02.001zbMath1275.46042OpenAlexW2963511330MaRDI QIDQ1948128
Publication date: 30 April 2013
Published in: Journal of Functional Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jfa.2013.02.001
commutation relationsnoncommutative torustwistisometriesrotation algebrauniversal \(C^\ast\)-algebra
(K)-theory and operator algebras (including cyclic theory) (46L80) General theory of (C^*)-algebras (46L05) Algebras of specific types of operators (Toeplitz, integral, pseudodifferential, etc.) (47L80)
Related Items (9)
On q-tensor products of Cuntz algebras ⋮ The structure of doubly non-commuting isometries ⋮ Orthogonal decompositions and twisted isometries ⋮ Beurling quotient subspaces for covariant representations of product systems ⋮ Classification of doubly \(\mathcal{U}\)-commuting row isometries ⋮ Lie polynomials in an algebra defined by a linearly twisted commutation relation ⋮ Functional calculus and multi-analytic models on regular \(\Lambda \)-polyballs ⋮ Doubly \(\Lambda\)-commuting row isometries, universal models, and classification ⋮ Doubly commuting invariant subspaces for representations of product systems of \(C^*\)-correspondences
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