For a Banach space X and a measure space (Ω,Σ), let M(Ω,X) be the space of all X-valued countably additive measures on (Ω,Σ) of bounded variation, with the total variation norm. In this paper we give a characterization of weakly precompact subsets of M(Ω,X)
A weak measure of noncompactness γU is defined in a Banach space in terms of convex compactness. We...
The notion of a measure of noncompactness turns out to be a very important and useful tool in many b...
summary:If $(\Omega ,\Sigma ) $ is a measurable space and $X$ a Banach space, we provide sufficient ...
If T:C(H,X)-->Y is a bounded linear operator then there exists a unique weakly regular finitely addi...
Let X be a completely regular Hausdorff space, E a Banach space, and $ M_{tbv}(X,$ $E)$ the space of...
AbstractIt is proved that a weak* compact subsetAof scalar measures on aσ-algebra is weakly compact ...
AbstractLet v be a countably additive measure defined on a measurable space (Ω, Σ) and taking values...
AbstractLet ν be a countably additive measure defined on a measurable space (Ω,Σ) and taking values ...
Abst rac t Let R be a ring of subsets of a nonempty set R and C(R) the Banach space of uniform limit...
Abstract It is proved that if X is infinite dimensional, then there exists an infinite dimensional s...
summary:We give a characterization of $K$-weakly precompact sets in terms of uniform Gateaux differe...
AbstractFor a finite and positive measure space (Ω, Σ, μ) characterization of relatively weakly comp...
summary:We give a characterization of $K$-weakly precompact sets in terms of uniform Gateaux differe...
Abstract. It is proved that every bounded infinite set in a weakly compactly determined Banach space...
AbstractFor a finite and positive measure space (Ω, Σ, μ) characterization of relatively weakly comp...
A weak measure of noncompactness γU is defined in a Banach space in terms of convex compactness. We...
The notion of a measure of noncompactness turns out to be a very important and useful tool in many b...
summary:If $(\Omega ,\Sigma ) $ is a measurable space and $X$ a Banach space, we provide sufficient ...
If T:C(H,X)-->Y is a bounded linear operator then there exists a unique weakly regular finitely addi...
Let X be a completely regular Hausdorff space, E a Banach space, and $ M_{tbv}(X,$ $E)$ the space of...
AbstractIt is proved that a weak* compact subsetAof scalar measures on aσ-algebra is weakly compact ...
AbstractLet v be a countably additive measure defined on a measurable space (Ω, Σ) and taking values...
AbstractLet ν be a countably additive measure defined on a measurable space (Ω,Σ) and taking values ...
Abst rac t Let R be a ring of subsets of a nonempty set R and C(R) the Banach space of uniform limit...
Abstract It is proved that if X is infinite dimensional, then there exists an infinite dimensional s...
summary:We give a characterization of $K$-weakly precompact sets in terms of uniform Gateaux differe...
AbstractFor a finite and positive measure space (Ω, Σ, μ) characterization of relatively weakly comp...
summary:We give a characterization of $K$-weakly precompact sets in terms of uniform Gateaux differe...
Abstract. It is proved that every bounded infinite set in a weakly compactly determined Banach space...
AbstractFor a finite and positive measure space (Ω, Σ, μ) characterization of relatively weakly comp...
A weak measure of noncompactness γU is defined in a Banach space in terms of convex compactness. We...
The notion of a measure of noncompactness turns out to be a very important and useful tool in many b...
summary:If $(\Omega ,\Sigma ) $ is a measurable space and $X$ a Banach space, we provide sufficient ...
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