A factorization property of positive maps on C*-algebras
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Publication:5130763
DOI10.1142/S0219749920500197zbMath1465.46054arXiv1912.02381OpenAlexW3047233090MaRDI QIDQ5130763
B. V. Rajarama Bhat, Hiroyuki Osaka
Publication date: 29 October 2020
Published in: International Journal of Quantum Information (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1912.02381
Quantum measurement theory, state operations, state preparations (81P15) Tensor products of (C^*)-algebras (46L06) Quantum information, communication, networks (quantum-theoretic aspects) (81P45)
Related Items (3)
Factorization properties for unbounded local positive maps ⋮ Mapping cone of \(k\)-entanglement breaking maps ⋮ Compositions and tensor products of linear maps between matrix algebras
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- All 2-positive linear maps from \(M_3(\mathbb{C})\) to \(M_3(\mathbb{C})\) are decomposable
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- Inequalities for the Schmidt number of bipartite states
- When do composed maps become entanglement breaking?
- Subalgebras of \(C^ *\)-algebras
- A family of indecomposable positive linear maps based on entangled quantum states
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