AbstractBasic properties of matricially normed spaces are considered, and a simple matrix norm characterization of the subspaces of C∗-algebras is given. The latter result is used to study the Haagerup tensor products and quotients of such subspaces
Let V be a real or complex finite-dimensional vector space, and let be a set of norms on V. The norm...
AbstractD. Blecher and V. Paulsen showed that the Haagerup tensor product V ⊗h W for operator spaces...
AbstractWe introduce and investigate the notion of a norming C*-subalgebra of C*-algebra. We charact...
AbstractBasic properties of matricially normed spaces are considered, and a simple matrix norm chara...
AbstractIn this paper we lay the foundations for a systematic study of tensor products of subspaces ...
AbstractWe extend work of Christensen and Sinclair on completely bounded multilinear forms to the ca...
AbstractIt is proved that the (analogy of the) Haagerup norm on the tenser product of submodules of ...
AbstractIt is proved that the (analogy of the) Haagerup norm on the tenser product of submodules of ...
AbstractWe define a collection of tensor product norms for C∗-algebras and show that a symmetric ten...
AbstractWe show that, if A is a finite-dimensional ∗-simple associative algebra with involution (ove...
AbstractThe concept of the regular (or Riesz) norm on ordered real Banach spaces is generalized to m...
AbstractThis paper is of expository nature. In the tensor product of two matrix spaces Mm and Mn we ...
AbstractIf A and B are C∗-algebras there is, in general, a multiplicity of C∗-norms on their algebra...
AbstractAn operator algebra is a uniformly closed algebra of bounded operators on a Hilbert space. I...
Abstract. Let A,B,C be C∗-algebras. Given A-B and B-C normed bi-modules V and W respectively, whose ...
Let V be a real or complex finite-dimensional vector space, and let be a set of norms on V. The norm...
AbstractD. Blecher and V. Paulsen showed that the Haagerup tensor product V ⊗h W for operator spaces...
AbstractWe introduce and investigate the notion of a norming C*-subalgebra of C*-algebra. We charact...
AbstractBasic properties of matricially normed spaces are considered, and a simple matrix norm chara...
AbstractIn this paper we lay the foundations for a systematic study of tensor products of subspaces ...
AbstractWe extend work of Christensen and Sinclair on completely bounded multilinear forms to the ca...
AbstractIt is proved that the (analogy of the) Haagerup norm on the tenser product of submodules of ...
AbstractIt is proved that the (analogy of the) Haagerup norm on the tenser product of submodules of ...
AbstractWe define a collection of tensor product norms for C∗-algebras and show that a symmetric ten...
AbstractWe show that, if A is a finite-dimensional ∗-simple associative algebra with involution (ove...
AbstractThe concept of the regular (or Riesz) norm on ordered real Banach spaces is generalized to m...
AbstractThis paper is of expository nature. In the tensor product of two matrix spaces Mm and Mn we ...
AbstractIf A and B are C∗-algebras there is, in general, a multiplicity of C∗-norms on their algebra...
AbstractAn operator algebra is a uniformly closed algebra of bounded operators on a Hilbert space. I...
Abstract. Let A,B,C be C∗-algebras. Given A-B and B-C normed bi-modules V and W respectively, whose ...
Let V be a real or complex finite-dimensional vector space, and let be a set of norms on V. The norm...
AbstractD. Blecher and V. Paulsen showed that the Haagerup tensor product V ⊗h W for operator spaces...
AbstractWe introduce and investigate the notion of a norming C*-subalgebra of C*-algebra. We charact...
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