AbstractWe extend work of Christensen and Sinclair on completely bounded multilinear forms to the case of subspaces of C∗ algebras, and obtain a representation theorem and a Hahn-Banach extension theorem for such maps. In the second part of the paper the Haagerup norms on tensor products are investigated, and we obtain new characterizations of these quantities
Abstract. Let K be any compact set. The C∗-algebra C(K) is nuclear and any bounded homomorphism from...
AbstractWe characterize the minimal and maximal operator ideals associated, in the sense of Defant a...
[EN] We study an (n + 1)-tensor norm alpha(r) extending to (n + 1)-fold tensor products, the classic...
AbstractWe extend work of Christensen and Sinclair on completely bounded multilinear forms to the ca...
AbstractIn this paper we lay the foundations for a systematic study of tensor products of subspaces ...
ABSTRACT. The norm of the mth derivative of the map that takes an operator to its kth antisymmetric ...
Abstract. The norm of the mth derivative of the map that takes an operator to its kth antisymmetric ...
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 ...
AbstractBasic properties of matricially normed spaces are considered, and a simple matrix norm chara...
[EN] Using a general tensor norm approach, our aim is to show that some distinguished classes of sum...
AbstractA definition of a completely bounded multilinear operator from one C∗-algebra into another i...
Abstract. We obtain a classification of the projective tensor product of C(K) spaces according to th...
AbstractIn a remarkable recent paper, Junge and Pisier (1995) prove that there are several distinct ...
University of Wisconsin--Eau Claire Office of Research and Sponsored Programs.Norms play a key role ...
Abstract. Let K be any compact set. The C∗-algebra C(K) is nuclear and any bounded homomorphism from...
AbstractWe characterize the minimal and maximal operator ideals associated, in the sense of Defant a...
[EN] We study an (n + 1)-tensor norm alpha(r) extending to (n + 1)-fold tensor products, the classic...
AbstractWe extend work of Christensen and Sinclair on completely bounded multilinear forms to the ca...
AbstractIn this paper we lay the foundations for a systematic study of tensor products of subspaces ...
ABSTRACT. The norm of the mth derivative of the map that takes an operator to its kth antisymmetric ...
Abstract. The norm of the mth derivative of the map that takes an operator to its kth antisymmetric ...
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 ...
AbstractBasic properties of matricially normed spaces are considered, and a simple matrix norm chara...
[EN] Using a general tensor norm approach, our aim is to show that some distinguished classes of sum...
AbstractA definition of a completely bounded multilinear operator from one C∗-algebra into another i...
Abstract. We obtain a classification of the projective tensor product of C(K) spaces according to th...
AbstractIn a remarkable recent paper, Junge and Pisier (1995) prove that there are several distinct ...
University of Wisconsin--Eau Claire Office of Research and Sponsored Programs.Norms play a key role ...
Abstract. Let K be any compact set. The C∗-algebra C(K) is nuclear and any bounded homomorphism from...
AbstractWe characterize the minimal and maximal operator ideals associated, in the sense of Defant a...
[EN] We study an (n + 1)-tensor norm alpha(r) extending to (n + 1)-fold tensor products, the classic...
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