List of talks in section of analysis
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Displaying similar documents to “List of talks”
List of talks in section of analysis
Remarks on stable measures on Banach spaces
Zbigniew Jurek, Kazimierz Urbanik (1978)
Colloquium Mathematicum
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Moments of Measures on Banach Spaces.
Werner Linde (1981)
Mathematische Annalen
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Biprojective tensor products and convolutions of vector-valued measures on a compact group
M. Duchoň (1970)
Studia Mathematica
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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...
Compactness and convergence of set-valued measures
Kenny Koffi Siggini (2009)
Colloquium Mathematicae
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We prove criteria for relative compactness in the space of set-valued measures whose values are compact convex sets in a Banach space, and we generalize to set-valued measures the famous theorem of Dieudonné on convergence of real non-negative regular measures.
Contents of volumes LI - LX
(1977)
Studia Mathematica
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Density in the space of topological measures
S. V. Butler (2002)
Fundamenta Mathematicae
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Topological measures (formerly "quasi-measures") are set functions that generalize measures and correspond to certain non-linear functionals on the space of continuous functions. The goal of this paper is to consider relationships between various families of topological measures on a given space. In particular, we prove density theorems involving classes of simple, representable, extreme topological measures and measures, hence giving a way of approximating various topological measures...
Kolmogoroff consistency theorem for Gleason measures
Artur Bartoszewicz (1978)
Colloquium Mathematicae
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On vector measures which have everywhere infinite variation or noncompact range
Lech Drewnowski, Zbigniew Lipecki
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CONTENTS1. Introduction..........................................................................................52. Vector measures with λ-everywhere infinite variation represented by series of simple measures.............113. Semicontinuity of some maps related to the variation map..................................................184. Sets of λ-continuous measures with (λ-) everywhere infinite variation.....................................235. Borel complexity of some spaces of vector...