The structure of \(C^\ast\)-subalgebras of the Toeplitz algebra fixed with respect to a finite group of automorphisms
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Publication:2516837
DOI10.3103/S1066369X15060031zbMath1338.46062OpenAlexW2493610307MaRDI QIDQ2516837
E. V. Lipacheva, K. G. Ovsepyan
Publication date: 4 August 2015
Published in: Russian Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3103/s1066369x15060031
General theory of (C^*)-algebras (46L05) Representations of (nonselfadjoint) operator algebras (47L55) Algebras of specific types of operators (Toeplitz, integral, pseudodifferential, etc.) (47L80)
Related Items (11)
Automorphisms of some subalgebras of the Toeplitz algebra ⋮ Type of some nuclear subalgebras of the Toeplitz algebra generated by inverse subsemigroups of a bicyclic semigroup ⋮ Inductive systems of \(C^\ast\)-algebras over posets: a survey ⋮ On extensions of semigroups and their applications to Toeplitz algebras ⋮ Inverse subsemigroups of the bicyclic semigroup ⋮ Extensions of semigroups and morphisms of semigroup \(C^* \)-algebras ⋮ A semigroup \(C^\ast\)-algebra which is a free Banach module ⋮ On a class of graded ideals of semigroup \(C^\ast\)-algebras ⋮ Nets of graded $C^*$-algebras over partially ordered sets ⋮ On inductive limits for systems of \(C^\ast\)-algebras ⋮ Embedding semigroup \(C^\ast\)-algebras into inductive limits
Cites Work
- On isometric representations of the semigroup \(\mathbb Z_+\backslash\{ 1\}\)
- \(C^*\)-algebras generated by cancellative semigroups
- A compact quantum semigroup generated by an isometry
- Infinite-dimensional compact quantum semigroup
- Isometric representations of totally ordered semigroups
- The 𝐶*-algebra generated by an isometry
- \(C^*\)-algebras by example
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