C\(^*\)-bialgebra defined by the direct sum of Cuntz algebras
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Publication:933383
DOI10.1016/j.jalgebra.2008.01.037zbMath1156.46038arXivmath/0702355OpenAlexW2080496866MaRDI QIDQ933383
Publication date: 21 July 2008
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0702355
Related Items (9)
NON-COCOMMUTATIVE C*-BIALGEBRA DEFINED AS THE DIRECT SUM OF FREE GROUP C*-ALGEBRAS ⋮ On compact quantum semigroup \(QS_{\text{red}}\) ⋮ Tensor products of type III factor representations of Cuntz-Krieger algebras ⋮ Inductive limit violates quasi-cocommutativity ⋮ Triangular \(C^{\ast}\)-bialgebra defined as the direct sum of matrix algebras ⋮ Pentagon equation arising from state equations of a C\(^*\)-bialgebra ⋮ C∗-Bialgebra Defined as the Direct Sum of Cuntz–Krieger Algebras ⋮ C*-bialgebra Defined as the Direct Sum of UHF Algebras ⋮ Classification of sub-Cuntz states
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