Convergence theorem of Pettis integrable multivalued pramart
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Publication:6136964
DOI10.1108/ajms-07-2021-0173zbMath1523.60079OpenAlexW4200000548MaRDI QIDQ6136964
M. El Allali, Fatima Ezzaki, M'hamed El-Louh
Publication date: 31 August 2023
Published in: Arab Journal of Mathematical Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1108/ajms-07-2021-0173
Pettis integralMosco convergencestopping timeconditional expectationmartingaleHausdorff distancesubpramartPettis integrable pramart
Set-valued set functions and measures; integration of set-valued functions; measurable selections (28B20) Generalizations of martingales (60G48) Vector-valued measures and integration (46G10)
Cites Work
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- Vitali type convergence theorems for Banach space valued integrals
- Some structure results for martingales in the limit and pramarts
- On multivalued martingales whose values may be unbounded: Martingale selectors and Mosco convergence
- Convex analysis and measurable multifunctions
- Integrals, conditional expectations, and martingales of multivalued functions
- Set valued Aumann-Pettis integrable martingale representation theorem and convergence
- Conditional expectation of Pettis integrable random sets: existence and convergence theorems
- Representation theorem of set valued regular martingale: application to the convergence of set valued martingale
- Strong Convergence of Pramarts in Banach Spaces
- Stopping Time Techniques for Analysts and Probabilists
- Support and distance functionals for convex sets
- Some various convergence results for multivalued martingales
- Pettis integral and measure theory
- Some remarks on pramarts and mils
- Measurable Multifunctions In Nonseparable Banach spaces
- REPRESENTATION THEOREMS FOR MULTIVALUED PRAMARTS
- Martingales of Strongly Measurable Pettis Integrable Functions
- On the Pettis integral of closed valued multifunctions
- Stopping Times and Directed Processes
