On Birkhoff's theorem for doubly stochastic completely positive maps of matrix algebras
From MaRDI portal
Publication:1318204
DOI10.1016/0024-3795(93)90274-RzbMath0797.15021MaRDI QIDQ1318204
R. F. Streater, Lawrence J. Landau
Publication date: 24 October 1994
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Norms of matrices, numerical range, applications of functional analysis to matrix theory (15A60) Algebraic systems of matrices (15A30) Convex sets in topological linear spaces; Choquet theory (46A55) Stochastic matrices (15B51)
Related Items (51)
A proof for the existence of nonsquare unextendible maximally entangled bases ⋮ Extremal states of qubit-qutrit system with maximally mixed marginals ⋮ Quantum earth mover’s distance, a no-go quantum Kantorovich–Rubinstein theorem, and quantum marginal problem ⋮ Which bath Hamiltonians matter for thermal operations? ⋮ Non-Markovianity criteria for mixtures of noninvertible Pauli dynamical maps ⋮ On the geometric interpretation of single qubit quantum operations on the Bloch sphere ⋮ Quantum lost and found ⋮ Unital quantum channels - convex structure and revivals of Birkhoff's theorem ⋮ On the mixed-unitary rank of quantum channels ⋮ Radon–Nikodym derivatives of quantum operations ⋮ Spin polarization-scaling quantum maps and channels ⋮ Some geometric interpretations of quantum fidelity ⋮ On the convex characterisation of the set of unital quantum channels ⋮ Examples of conditional SIC-POVMs ⋮ Generalizations of 2-dimensional diagonal quantum channels with constant Frobenius norm ⋮ Maximal ergodic inequalities for some positive operators on noncommutative Lp$L_p$‐spaces ⋮ Microcanonical thermodynamics in general physical theories ⋮ 𝐶*-extreme points in the generalised state spaces of a 𝐶*-algebra ⋮ A branching space-times view on quantum error correction ⋮ Quantum informational properties of the Landau–Streater channel ⋮ Quantum magic squares: Dilations and their limitations ⋮ Ergodic and mixing quantum channels in finite dimensions ⋮ All unital qubit channels are 4-noisy operations ⋮ Gibbs-preserving maps outperform thermal operations in the quantum regime ⋮ Extreme points and factorizability for new classes of unital quantum channels ⋮ On the minimum number of unitaries needed to describe a random-unitary channel ⋮ Classical and quantum probability ⋮ Special classes of positive and completely positive maps ⋮ Self-dual maps and symmetric bistochastic matrices ⋮ Factorization and dilation problems for completely positive maps on von Neumann algebras ⋮ Positive and doubly stochastic maps, and majorization in Euclidean Jordan algebras ⋮ Quantifying decoherence of Gaussian noise channels ⋮ The probability of entanglement ⋮ Interpolation by completely positive maps ⋮ On quantum operations as quantum states ⋮ Sinkhorn–Knopp theorem for rectangular positive maps ⋮ Maximal rank of extremal marginal tracial states ⋮ Sinkhorn-Knopp theorem for PPT states ⋮ Generating random quantum channels ⋮ The structure of degradable quantum channels ⋮ Additivity and distinguishability of random unitary channels ⋮ Dynamical decoupling leads to improved scaling in noisy quantum metrology ⋮ Log-convex set of Lindblad semigroups acting on N-level system ⋮ Decomposition of time-covariant operations on quantum systems with continuous and∕or discrete energy spectrum ⋮ A linearization of quantum channels ⋮ On a class of quantum channels, open random walks and recurrence ⋮ Classical capacity of generalized Pauli channels ⋮ On Quasi-Inversion of Quantum Channels in 2 and in Higher Dimensions ⋮ Distinguishing classically indistinguishable states and channels ⋮ Nullspaces of entanglement breaking channels and applications ⋮ Quasi-inversion of quantum and classical channels in finite dimensions
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- General state changes in quantum theory
- On the completely positive and positive-semidefinite-preserving cones
- States, effects, and operations. Fundamental notions of quantum theory. Lectures in mathematical physics at the University of Texas at Austin. Ed. by A. Böhm, J. D. Dollard and W. H. Wootters
- The essentially commutative dilations of dynamical semigroups on \(M_ n\)
- Completely positive and Hermitian-preserving linear transformations
- Completely positive linear maps on complex matrices
- On the generators of quantum dynamical semigroups
- On the generator of completely positive dynamical semigroups of N-level systems
- Linear transformations which preserve Hermitian and positive semidefinite operators
- On nuclear C\(^*\)-algebras
- Linear transformations which preserve trace and positive semidefiniteness of operators
- Completely positive dynamical semigroups of N-level systems
- Positive Linear Maps on C*-Algebras
- A Theory of Cross-Spaces. (AM-26)
This page was built for publication: On Birkhoff's theorem for doubly stochastic completely positive maps of matrix algebras
