Add to ORKGAll infinite families F of K-vector spaces with the following properties are determinated: the dimension of the tensor product of all V 08 F is equal of the product of the dimensions of all V and, choosing a basis in any V, the tensor mapping maps the product of these basis into a basis of the tensor product. Moreover, a characterization, which is formally equal to that the universal tensor product property, is given for the K-vector space with dimension equal to the product of an arbitrary family di fixed cardinal numbers
AbstractGiven a finite-dimensional vector spaceV, we construct a family of projective geometries who...
Tensor products of Banach Spaces are studied. An introduction to tensor products is given. Some resu...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...
Praca skupia się na przedstawieniu kilku podstawowych własności iloczynu tensorowego przestrzeni sko...
AbstractThis paper is concerned with the dimension theory of tensor products of algebras over a fiel...
TENSOR PRODUCTS OF VECTOR SPACES Bachelor thesis Author: Michal Řepík Department: Department of Math...
Given a finite or countably infinite family of Hilbert spaces \((H_j)_{j\in N} \), we study the Hilb...
International audienceLet X be a Banach space, I an infinite set, τ an infinite cardinal and p ∈ [1,...
Let U, V be two vector spaces of dimensions n and m, respectively, over an algebraically closed fiel...
In this paper we prove that the Fremlin tensor product of two ƒ-algebras can be endowed with an ƒ-al...
AbstractThe purpose of this paper is to compute the Krull dimension of tensor products of k-algebras...
AbstractIn this paper we construct a new class of infinite tensor product Banach spaces. We call the...
AbstractWe give sufficient conditions for the universality of tensor products {Tn⊗Rn:n∈N} of sequenc...
We review and study the Künneth theorem for tensor products of C^*-algebras,which is obtained by Cla...
ABSTRACT. The problern of topologies of Grothendieck is considered for complete tensor products of F...
AbstractGiven a finite-dimensional vector spaceV, we construct a family of projective geometries who...
Tensor products of Banach Spaces are studied. An introduction to tensor products is given. Some resu...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...
Praca skupia się na przedstawieniu kilku podstawowych własności iloczynu tensorowego przestrzeni sko...
AbstractThis paper is concerned with the dimension theory of tensor products of algebras over a fiel...
TENSOR PRODUCTS OF VECTOR SPACES Bachelor thesis Author: Michal Řepík Department: Department of Math...
Given a finite or countably infinite family of Hilbert spaces \((H_j)_{j\in N} \), we study the Hilb...
International audienceLet X be a Banach space, I an infinite set, τ an infinite cardinal and p ∈ [1,...
Let U, V be two vector spaces of dimensions n and m, respectively, over an algebraically closed fiel...
In this paper we prove that the Fremlin tensor product of two ƒ-algebras can be endowed with an ƒ-al...
AbstractThe purpose of this paper is to compute the Krull dimension of tensor products of k-algebras...
AbstractIn this paper we construct a new class of infinite tensor product Banach spaces. We call the...
AbstractWe give sufficient conditions for the universality of tensor products {Tn⊗Rn:n∈N} of sequenc...
We review and study the Künneth theorem for tensor products of C^*-algebras,which is obtained by Cla...
ABSTRACT. The problern of topologies of Grothendieck is considered for complete tensor products of F...
AbstractGiven a finite-dimensional vector spaceV, we construct a family of projective geometries who...
Tensor products of Banach Spaces are studied. An introduction to tensor products is given. Some resu...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...