On \(K\)-theoretic invariants of semigroup \(C^\ast\)-algebras attached to number field. II
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Publication:2634776
DOI10.1016/j.aim.2015.12.024zbMath1357.46048arXiv1212.3199OpenAlexW4206031383MaRDI QIDQ2634776
Publication date: 18 February 2016
Published in: Advances in Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1212.3199
(K)-theory and operator algebras (including cyclic theory) (46L80) General theory of (C^*)-algebras (46L05) Class numbers, class groups, discriminants (11R29) Algebraic numbers; rings of algebraic integers (11R04)
Related Items (6)
\(\mathrm C^*\)-algebras of right LCM one-relator monoids and Artin-Tits monoids of finite type ⋮ Constructing number field isomorphisms from \(*\)-isomorphisms of certain crossed product \(\mathrm{C}^*\)-algebras ⋮ Classification of irreversible and reversible Pimsner operator algebras ⋮ C*-algebras from actions of congruence monoids on rings of algebraic integers ⋮ Semigroup C∗-Algebras ⋮ On K-theoretic invariants of semigroup C*-algebras from actions of congruence monoids
Cites Work
- On \(K\)-theoretic invariants of semigroup \(C^*\)-algebras attached to number fields
- On the equation \(\zeta_K(s)=\zeta_{K'}(s)\)
- A new characterization of arithmetic equivalence
- On the \(K\)-theory of the \(C^\ast\)-algebra generated by the left regular representation of an Ore semigroup
- \(C^*\)-algebras of Toeplitz type associated with algebraic number fields
- Cartan subalgebras in C*-algebras
- Zeta functions do not determine class numbers
- Continuous orbit equivalence rigidity
- The primitive ideal space of the C*-algebra of the affine semigroup of algebraic integers
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