On the Theory of (Dual) Projection for Fuzzy Stochastic Processes
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Publication:5316798
DOI10.1081/SAP-200056646zbMath1072.60029OpenAlexW2008583325MaRDI QIDQ5316798
Publication date: 15 September 2005
Published in: Stochastic Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1081/sap-200056646
fuzzy measurefuzzy stochastic integraldual optional (predictable) projectionincreasing fuzzy stochastic processesoptional (predictable) projection.
Related Items (4)
Existence and uniqueness of solution for fuzzy random differential equations with non-Lipschitz coefficients ⋮ A GENERALIZATION OF BIHARI'S INEQUALITY AND FUZZY RANDOM DIFFERENTIAL EQUATIONS WITH NON-LIPSCHITZ COEFFICIENTS ⋮ On solutions to fuzzy stochastic differential equations with local martingales ⋮ Properties of solutions to stochastic set differential equations under non-Lipschitzian coefficients
Cites Work
- Unnamed Item
- Radon-Nikodým theorem and conditional expectation of fuzzy-valued measures and variables
- The calculus of fuzzy valued functions
- The strong law of large numbers for fuzzy random variables
- On the theory of Banach space valued multifunctions. I: Integration and conditional expectation
- A central limit theorem for fuzzy random variables
- Fuzzy random variables - I. Definitions and theorems
- On multivalued martingales whose values may be unbounded: Martingale selectors and Mosco convergence
- Integrals, conditional expectations, and martingales of multivalued functions
- Doob's stopping theorem for fuzzy (super, sub) martingales with discrete time
- Doob's Decomposition Theorem for Fuzzy (Super) Submartingales
- A convergence theorem for set valued supermartingales with values in a separable banach space∗
- Fuzzy martingales - a simple form of fuzzy processes∗
- Fuzzy random variables
- A unified approach to fuzzy random variables
- Separability for graph convergence of sequences of fuzzy-valued random variables
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