Measures of noncompactness in Banach sequence spaces
Józef Banaś, Antonio Martinón (1992)
Mathematica Slovaca
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Displaying similar documents to “Note on measures of noncompactness in Banach sequence spaces.”
Measures of noncompactness in Banach sequence spaces
Measures of noncompactness in the study of solutions of nonlinear differential and integral equations
Józef Banaś (2012)
Open Mathematics
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The aim of this paper is to make an overview of some existence results for nonlinear differential and integral equations. Those results were obtained by the author and his co-workers during last years with some help of the technique of measures of noncompactness and a fixed point theorem of Darbo type.
Measures of weak noncompactness in Banach sequence spaces.
Banas, Jozef, Martinón, Antonio (1995)
Portugaliae Mathematica
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A system of axioms for measures on noncompactness
Antonio Martinón (1989)
Extracta Mathematicae
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Infinitely divisible cylindrical measures on Banach spaces
Markus Riedle (2011)
Studia Mathematica
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In this work infinitely divisible cylindrical probability measures on arbitrary Banach spaces are introduced. The class of infinitely divisible cylindrical probability measures is described in terms of their characteristics, a characterisation which is not known in general for infinitely divisible Radon measures on Banach spaces. Further properties of infinitely divisible cylindrical measures such as continuity are derived. Moreover, the classification result enables us to deduce new...
Some remarks on an operator equation in a Banach space
Bogdan Rzepecki (1980)
Annales Polonici Mathematici
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Compactness of the integration operator associated with a vector measure
S. Okada, W. J. Ricker, L. Rodríguez-Piazza (2002)
Studia Mathematica
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A characterization is given of those Banach-space-valued vector measures m with finite variation whose associated integration operator Iₘ: f ↦ ∫fdm is compact as a linear map from L¹(m) into the Banach space. Moreover, in every infinite-dimensional Banach space there exist nontrivial vector measures m (with finite variation) such that Iₘ is compact, and other m (still with finite variation) such that Iₘ is not compact. If m has infinite variation, then Iₘ is never compact.
Nonlinear structures determined by measures on Banach spaces
K. David Elworthy (1976)
Mémoires de la Société Mathématique de France
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On the Volterra integral equation and axiomatic measures of weak noncompactness
Dariusz Bugajewski (2001)
Mathematica Bohemica
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We prove that a set of weak solutions of the nonlinear Volterra integral equation has the Kneser property. The main condition in our result is formulated in terms of axiomatic measures of weak noncompactness.
Stretched shadings and a Banach measure that is not scale-invariant
Richard D. Mabry (2010)
Fundamenta Mathematicae
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It is shown that if A ⊂ ℝ has the same constant shade with respect to all Banach measures, then the same is true of any similarity transformation of A and the shade is not changed by the transformation. On the other hand, if A ⊂ ℝ has constant μ-shade with respect to some fixed Banach measure μ, then the same need not be true of a similarity transformation of A with respect to μ. But even if it is, the μ-shade might be changed by the transformation. To prove such a μ exists, a Hamel...