C*-Algebras With Real Rank Zero and The Internal Structure of Their Corona and Multiplier Algebras Part III
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Publication:5753042
DOI10.4153/CJM-1990-010-5zbMath0721.46033MaRDI QIDQ5753042
Publication date: 1990
Published in: Canadian Journal of Mathematics (Search for Journal in Brave)
multiplier algebraapproximate identitycorona algebraselfadjoint elementssimple \(C^ *\)-algebra with the `FS' propertysimple AF algebrasstructure of projections
Related Items (14)
When almost multiplicative morphisms are close to homomorphisms ⋮ Riesz decomposition in inductive limit \(C^*\)-algebras ⋮ \(C^*\)-algebras with weak (FN) ⋮ Trivial \(K_ 1\)-flow of AF algebras and finite von Neumann algebras ⋮ \(K_ 0\) of multiplier algebras of \(C^*\)-algebras with real rank zero ⋮ Positive combinations of projections in von Neumann algebras and purely infinite simple \(C^*\)-algebras ⋮ FS-property for 𝐶*-algebras ⋮ A generalization of Voiculescu's theorem for normal operators to semifinite von Neumann algebras ⋮ Ideal Structure of Multiplier Algebras of Simple C*-algebras With Real Rank Zero ⋮ On infinite simple \(C^*\)-algebras ⋮ \(C^*\)-algebras of real rank zero ⋮ Projection decomposition in multiplier algebras ⋮ Certain \(C^*\)-algebras with real rank zero and their corona and multiplier algebras. II ⋮ Classification of homomorphisms from \(C(X)\) to simple \(C^*\)-algebras of real rank zero
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