Add to ORKGWe prove that measures with relatively norm compact range correspond to the infinite-nuclear operators and to a p-Bochner integrable function (resp. p-Pettis integrable function) correspond a p-nuclear operator (resp. a q-nuclear operator)
AbstractWe prove that an operator system S is nuclear in the category of operator systems if and onl...
AbstractThe relationship between the average range of the measure defined by an m-integrable functio...
The properties of the compositions of nuclear maps, between two locally convex spaces, with vector m...
We prove that measures with relatively norm compact range correspond to the infinite-nuclear operato...
Let (S, B, in) be a finite measure space. The aim of this paper is to give necessary and sufficient ...
In this paper, we introduce strongly Lipschitz p-integral operators, strongly Lipschitzp-nuclear ope...
We characterize some properties of a vector measure in terms of its associated Kluvánek conical meas...
We give necessary and sufficient conditions that some operators on the space C[0,1] be weakly compac...
AbstractCharacterizations are given of those Fréchet spaces E such that every compact subset of E li...
We introduce the classes of operator p-compact mappings and completely right p-nuclear operators, wh...
We use techniques from time-frequency analysis to show that the space $mathcal S_omega$ of rapidly d...
AbstractWe characterize the p-approximation property (p-AP) introduced by Sinha and Karn [D.P. Sinha...
It is shown that the Hankel operator for discrete-time infinite-dimensional systems with a stable st...
Let K ∈ L∞ ([0, 1]2) be such that for λ-almost all t ∈ [0, 1] the function K (t, ·) is continuous, ɑ...
Prévôt C, Röckner M. Nuclear and Hilbert-Schmidt Operators. In: Prévôt C, Röckner M, eds. A Concise ...
AbstractWe prove that an operator system S is nuclear in the category of operator systems if and onl...
AbstractThe relationship between the average range of the measure defined by an m-integrable functio...
The properties of the compositions of nuclear maps, between two locally convex spaces, with vector m...
We prove that measures with relatively norm compact range correspond to the infinite-nuclear operato...
Let (S, B, in) be a finite measure space. The aim of this paper is to give necessary and sufficient ...
In this paper, we introduce strongly Lipschitz p-integral operators, strongly Lipschitzp-nuclear ope...
We characterize some properties of a vector measure in terms of its associated Kluvánek conical meas...
We give necessary and sufficient conditions that some operators on the space C[0,1] be weakly compac...
AbstractCharacterizations are given of those Fréchet spaces E such that every compact subset of E li...
We introduce the classes of operator p-compact mappings and completely right p-nuclear operators, wh...
We use techniques from time-frequency analysis to show that the space $mathcal S_omega$ of rapidly d...
AbstractWe characterize the p-approximation property (p-AP) introduced by Sinha and Karn [D.P. Sinha...
It is shown that the Hankel operator for discrete-time infinite-dimensional systems with a stable st...
Let K ∈ L∞ ([0, 1]2) be such that for λ-almost all t ∈ [0, 1] the function K (t, ·) is continuous, ɑ...
Prévôt C, Röckner M. Nuclear and Hilbert-Schmidt Operators. In: Prévôt C, Röckner M, eds. A Concise ...
AbstractWe prove that an operator system S is nuclear in the category of operator systems if and onl...
AbstractThe relationship between the average range of the measure defined by an m-integrable functio...
The properties of the compositions of nuclear maps, between two locally convex spaces, with vector m...