King and Ruskai asked whether the norm of a completely positive map acting between Schatten classes of operators is equal to that of its restriction to the real subspace of self-adjoint operators. Proofs have been promptly supplied by Watrous and Audenaert. Here we provide one more proof, in fact of a slightly more general fact, under the (slightly weaker) assumption of 2-positivity. The argument is elementary and self-contained
Abstract. In this paper, we study maps φ of positive operators of Schatten p-classes (1 < p < ...
Let T = A + iB with A positive semidefinite and B Hermitian. We derive a majorisation relation invo...
If A = B + iC is a normal operator, where B, C are Hermitian, then in each unitarily invariant norm,...
AbstractKing and Ruskai asked whether the p→q norm of a completely positive map Φ, acting between Sc...
International audienceArveson's extension theorem guarantees that every completely positive map defi...
Here are some references and telegraphic notes on completely positive maps of operator algebras. No ...
This paper considers basic properties of super-operator norms induced by Schatten p-norms. Such supe...
We consider the maximal p-norm associated with a completely positive map and the question of its mul...
ABSTRACT. Let 0 < T: LP(Y, v)-+ Lq(X, ) be a positive linear operator and let HITIP,q denote its ...
AbstractWe study the positive minorant property for norms on spaces of matrices. A matrix is said to...
A bounded linear operator T : H → H, where H is a Hilbert space, is said to be norm attaining if the...
A bounded linear operator T: H1 → H2, where H1, H2 are Hilbert spaces, is said to be norm attaining ...
AbstractRecently, Rainer Wittmann proved a strong “zero-two” law for positive contractions of Lp-spa...
We define unbounded, completely positive, operator valued linear maps on C*-algebras, and investigat...
AbstractIf A = B + iC is a normal operator, where B, C are Hermitian, then in each unitarily invaria...
Abstract. In this paper, we study maps φ of positive operators of Schatten p-classes (1 < p < ...
Let T = A + iB with A positive semidefinite and B Hermitian. We derive a majorisation relation invo...
If A = B + iC is a normal operator, where B, C are Hermitian, then in each unitarily invariant norm,...
AbstractKing and Ruskai asked whether the p→q norm of a completely positive map Φ, acting between Sc...
International audienceArveson's extension theorem guarantees that every completely positive map defi...
Here are some references and telegraphic notes on completely positive maps of operator algebras. No ...
This paper considers basic properties of super-operator norms induced by Schatten p-norms. Such supe...
We consider the maximal p-norm associated with a completely positive map and the question of its mul...
ABSTRACT. Let 0 < T: LP(Y, v)-+ Lq(X, ) be a positive linear operator and let HITIP,q denote its ...
AbstractWe study the positive minorant property for norms on spaces of matrices. A matrix is said to...
A bounded linear operator T : H → H, where H is a Hilbert space, is said to be norm attaining if the...
A bounded linear operator T: H1 → H2, where H1, H2 are Hilbert spaces, is said to be norm attaining ...
AbstractRecently, Rainer Wittmann proved a strong “zero-two” law for positive contractions of Lp-spa...
We define unbounded, completely positive, operator valued linear maps on C*-algebras, and investigat...
AbstractIf A = B + iC is a normal operator, where B, C are Hermitian, then in each unitarily invaria...
Abstract. In this paper, we study maps φ of positive operators of Schatten p-classes (1 < p < ...
Let T = A + iB with A positive semidefinite and B Hermitian. We derive a majorisation relation invo...
If A = B + iC is a normal operator, where B, C are Hermitian, then in each unitarily invariant norm,...