Add to ORKGIn this note, we discuss dilation-theoretic matrix parametrizations of contractions and positive matrices. These parametrizations are then applied to some problems in quantum information theory. First we establish some properties of positive maps, or entanglement witnesses. Two further applications, concerning concrete dilations of completely positive maps, in particular quantum operations, are given
International audienceWe analyze bipartite matrices and linear maps between matrix algebras, which a...
We construct a new class of positive indecomposable maps in the algebra of 'd x d' complex matrices....
Dilations of positive operator measures and bimeasures related to quantum mechanic
This paper reviews some characterizations of positive matrices and discusses which lead to useful pa...
We provide a partial classification of positive linear maps in matrix algebras which is based on a f...
We provide a new class of positive maps in matrix algebras. The construction is based on the family ...
comments are welcomeThe theory of positive maps plays a central role in operator algebras and functi...
We characterize a convex subset of entanglement witnesses for two qutrits. Equivalently, we provide ...
We present certain existence criteria and parameterizations for an interpolation problem for complet...
We provide a generalization of the reduction and Robertson positive maps in matrix algebras. They gi...
AbstractWe show a continuity theorem for Stinespring's dilation: two completely positive maps betwee...
This book provides readers with a concise introduction to current studies on operator-algebras and t...
Linear maps of matrices describing the evolution of density matrices for a quantum system initially ...
Exposed positive maps in matrix algebras define a dense subset of extremal maps. We provide a suffic...
textThe structure of the set of density matrices, its linear transformations, generalized linear mea...
International audienceWe analyze bipartite matrices and linear maps between matrix algebras, which a...
We construct a new class of positive indecomposable maps in the algebra of 'd x d' complex matrices....
Dilations of positive operator measures and bimeasures related to quantum mechanic
This paper reviews some characterizations of positive matrices and discusses which lead to useful pa...
We provide a partial classification of positive linear maps in matrix algebras which is based on a f...
We provide a new class of positive maps in matrix algebras. The construction is based on the family ...
comments are welcomeThe theory of positive maps plays a central role in operator algebras and functi...
We characterize a convex subset of entanglement witnesses for two qutrits. Equivalently, we provide ...
We present certain existence criteria and parameterizations for an interpolation problem for complet...
We provide a generalization of the reduction and Robertson positive maps in matrix algebras. They gi...
AbstractWe show a continuity theorem for Stinespring's dilation: two completely positive maps betwee...
This book provides readers with a concise introduction to current studies on operator-algebras and t...
Linear maps of matrices describing the evolution of density matrices for a quantum system initially ...
Exposed positive maps in matrix algebras define a dense subset of extremal maps. We provide a suffic...
textThe structure of the set of density matrices, its linear transformations, generalized linear mea...
International audienceWe analyze bipartite matrices and linear maps between matrix algebras, which a...
We construct a new class of positive indecomposable maps in the algebra of 'd x d' complex matrices....
Dilations of positive operator measures and bimeasures related to quantum mechanic