AbstractA modulus function φ is a continuous strictly increasing subadditive real valued function φ: [0, ∞) → [0, ∞) for which φ(0) = 0. The object of this paper is to define φ-nuclear operators in Banach spaces. The basic properties of these operators are studied. In particular it is proved that φ-nuclear operators are stable under injective tensor product. In case of Hilbert spaces, the extreme points of the unit ball and the isometrics of such class of operators are characterized
Let X and Y be infinite-dimensional Banach spaces. Let $T: X → Y$ be a linear continuous operator wi...
A nuclear operator T on a Banach space is an operator admitting a representation T = (SIGMA) T(,n) w...
AbstractLet G be the closed unit ball of some norm on Cn, and let A(G) be the closure of the polynom...
AbstractA modulus function φ is a continuous strictly increasing subadditive real valued function φ:...
AbstractThis paper contains manageable necessary and sufficient conditions for the nuclearity of a c...
AbstractA class of operators is introduced and referred to as nonlinear nuclear operators. As in the...
AbstractThe present paper evolves from Berezanskii and Gali (Ukrainian Math. J. 24 (4) (1972), 435–4...
AbstractThis paper is a study of the distribution of eigenvalues of various classes of operators. In...
AbstractWe prove that an operator system S is nuclear in the category of operator systems if and onl...
AbstractLet X and Y be Banach spaces and let α be a tensor norm. The principal result is the followi...
AbstractLetXbe a finite-dimensional Banach space. The following affirmations are equivalent:•is a Hi...
AbstractLet φ: [0, ∞) → [0, ∞) be a continuous subadditive strictly increasing function and φ(0) = 0...
summary:In the paper the geometric properties of the positive cone and positive part of the unit bal...
In this paper, we first prove the metric approximation property for weighted mixed-norm L-p spaces. ...
Let K ∈ L∞ ([0, 1]2) be such that for λ-almost all t ∈ [0, 1] the function K (t, ·) is continuous, ɑ...
Let X and Y be infinite-dimensional Banach spaces. Let $T: X → Y$ be a linear continuous operator wi...
A nuclear operator T on a Banach space is an operator admitting a representation T = (SIGMA) T(,n) w...
AbstractLet G be the closed unit ball of some norm on Cn, and let A(G) be the closure of the polynom...
AbstractA modulus function φ is a continuous strictly increasing subadditive real valued function φ:...
AbstractThis paper contains manageable necessary and sufficient conditions for the nuclearity of a c...
AbstractA class of operators is introduced and referred to as nonlinear nuclear operators. As in the...
AbstractThe present paper evolves from Berezanskii and Gali (Ukrainian Math. J. 24 (4) (1972), 435–4...
AbstractThis paper is a study of the distribution of eigenvalues of various classes of operators. In...
AbstractWe prove that an operator system S is nuclear in the category of operator systems if and onl...
AbstractLet X and Y be Banach spaces and let α be a tensor norm. The principal result is the followi...
AbstractLetXbe a finite-dimensional Banach space. The following affirmations are equivalent:•is a Hi...
AbstractLet φ: [0, ∞) → [0, ∞) be a continuous subadditive strictly increasing function and φ(0) = 0...
summary:In the paper the geometric properties of the positive cone and positive part of the unit bal...
In this paper, we first prove the metric approximation property for weighted mixed-norm L-p spaces. ...
Let K ∈ L∞ ([0, 1]2) be such that for λ-almost all t ∈ [0, 1] the function K (t, ·) is continuous, ɑ...
Let X and Y be infinite-dimensional Banach spaces. Let $T: X → Y$ be a linear continuous operator wi...
A nuclear operator T on a Banach space is an operator admitting a representation T = (SIGMA) T(,n) w...
AbstractLet G be the closed unit ball of some norm on Cn, and let A(G) be the closure of the polynom...