Recent development of the theory of completely bounded maps between \(C^*\)-algebras
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Publication:798925
DOI10.2977/prims/1195182030zbMath0547.46036OpenAlexW2111536792MaRDI QIDQ798925
Publication date: 1983
Published in: Publications of the Research Institute for Mathematical Sciences, Kyoto University (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2977/prims/1195182030
completely positive mapcompletely bounded maps between \(C^*\)- algebrasgrowth condition of the multiplicity maps
Related Items (6)
On the norm of a Schur product ⋮ Completely positive maps and*-isomorphism ofC *-algebras II ⋮ Completely Bounded Maps between the Preduals of Von Neumann Algebras ⋮ Equivalence of norms on operator space tensor products of $C^\ast $-algebras ⋮ Fourier analysis for type III representations of the noncommutative torus ⋮ On the geometry of positive maps in matrix algebras
Cites Work
- Every completely polynomially bounded operator is similar to a contraction
- Ein operatorwertiger Hahn-Banach Satz
- A Hahn decomposition for linear maps
- On the geometry of positive maps in matrix algebras
- Applications of Fubini type theorem to the tensor products of \(C^ *\)- algebras
- Subalgebras of \(C^ *\)-algebras
- On the Transpose Map of Matrix Algebras
- Completely Bounded Maps on C ∗ -Algebras and Invariant Operator Ranges
- Extensions of derivations II.
- Decompositions of Linear Maps
- Nuclear C ∗ -Algebras and the Approximation Property
- An Example in the Space of Bounded Operators from C(X) to C(Y)
- Contractive linear maps on \(C^*\)-algebras
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