Upper Probabilities Attainable by Distributions of Measurable Selections
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Publication:3638159
DOI10.1007/978-3-642-02906-6_30zbMath1245.68218OpenAlexW1590588442MaRDI QIDQ3638159
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Publication date: 2 July 2009
Published in: Lecture Notes in Computer Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-642-02906-6_30
Aumann integralChoquet integralrandom setsmeasurable selectionsDempster-Shafer upper and lower probabilitiesreducible \(\sigma \)-fields
Contents, measures, outer measures, capacities (28A12) Reasoning under uncertainty in the context of artificial intelligence (68T37)
Related Items (5)
Random intervals as a model for imprecise information ⋮ Upper and lower probabilities induced by a fuzzy random variable ⋮ Random sets as imprecise random variables ⋮ Approximations of upper and lower probabilities by measurable selections ⋮ Joint propagation of probability and possibility in risk analysis: towards a formal framework
Cites Work
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- Random sets as imprecise random variables
- The mean value of a fuzzy number
- Statistics with vague data
- On random sets and belief functions
- Non-additive measure and integral
- Fundamentals of uncertainty calculi with applications to fuzzy inference
- Equally distributed correspondences
- Random intervals as a model for imprecise information
- A random set characterization of possibility measures
- Integrals of set-valued functions
- Minimax tests and the Neyman-Pearson lemma for capacities
- When fuzzy measures are upper envelopes of probability measures
- Theory of capacities
- Law of Large Numbers for Random Sets and Allocation Processes
- On measurable relation
- Measurable relations
- Survey of Measurable Selection Theorems
- Decision Making with Monotone Lower Probabilities of Infinite Order
- Upper and Lower Probabilities Induced by a Multivalued Mapping
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