COMPACTLY-ALIGNED DISCRETE PRODUCT SYSTEMS, AND GENERALIZATIONS OF ${\mathcal O}_\infty$
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Publication:2728472
DOI10.1142/S0129167X99000306zbMath1110.46306arXivmath/9809181OpenAlexW2261782167MaRDI QIDQ2728472
Publication date: 1 August 2001
Published in: International Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/9809181
Related Items (6)
\(\mathrm C^*\)-envelopes of semicrossed products by lattice ordered abelian semigroups ⋮ Couniversality and controlled maps on product systems over right LCM semigroups ⋮ Product systems of \(\mathrm{C}^*\)-correspondences and Takai duality ⋮ Representations of product systems over semigroups and dilations of commuting CP maps ⋮ Tensor algebras of product systems and their \(C^\ast \)-envelopes ⋮ On \(C^*\)-algebras of irreversible algebraic dynamical systems
Cites Work
- K-theory for certain C*-algebras
- Discrete product systems and their \(C^*\)-algebras
- Simple \(C^*\)-algebras generated by isometries
- Discrete product systems and twisted crossed products by semigroups
- Semigroup crossed products and the Toeplitz algebras of nonabelian groups
- On the \(C^*\)-algebra of a one-parameter semigroup of isometries
- Discrete product systems with twisted units
- The 𝐶*-algebra generated by an isometry
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