Arbeitspapier
Compactness in spaces of inner regular measures and a general Portmanteau lemma
The new aspect is that neither assumptions on compactness of the inner approximating lattices nor nonsequential continuity properties for the measures will be imposed. As a providing step also a generalization of the classical Portmanteau lemma will be established. The obtained characterizations of compact subsets w.r.t. the weak topology encompass several known ones from literature. The investigations rely basically on the inner extension theory for measures which has been systemized recently by König ([8], [10],[12]).
- Language
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Englisch
- Bibliographic citation
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Series: SFB 649 Discussion Paper ; No. 2006,081
- Classification
-
Wirtschaft
Miscellaneous Mathematical Tools
- Subject
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Inner premeasures
weak topology
generalized Portmanteau lemma
- Event
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Geistige Schöpfung
- (who)
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Krätschmer, Volker
- Event
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Veröffentlichung
- (who)
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Humboldt University of Berlin, Collaborative Research Center 649 - Economic Risk
- (where)
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Berlin
- (when)
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2006
- Handle
- Last update
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10.03.2025, 11:43 AM CET
Data provider
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ZBW - Deutsche Zentralbibliothek für Wirtschaftswissenschaften - Leibniz-Informationszentrum Wirtschaft. If you have any questions about the object, please contact the data provider.
Object type
- Arbeitspapier
Associated
- Krätschmer, Volker
- Humboldt University of Berlin, Collaborative Research Center 649 - Economic Risk
Time of origin
- 2006
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Compactness in apartness spaces?
Compactness in general function spaces
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Yoneda Lemma for Simplicial Spaces
Weak compactness in certain Banach spaces
Compactness of infinite dimensional parameter spaces
Compactness Principles for Topological Vector Spaces
Extrapolation of Compactness on Banach Function Spaces
NONCOMMUTATIVE REGULAR MEASURES
Compactness in Spaces of Inner Regular Measures and a General Portmanteau Lemma
Young measures and compactness in measure spaces
Regular measures of noncompactness and Ascoli–Arzelà type compactness criteria in spaces of vector-valued functions
Compactness in apartness spaces?
Compactness in general function spaces
Compactness Properties for Modulation Spaces
Yoneda Lemma for Simplicial Spaces
Weak compactness in certain Banach spaces
Compactness of infinite dimensional parameter spaces
Compactness Principles for Topological Vector Spaces
Extrapolation of Compactness on Banach Function Spaces