Choquet type \(L^{1}\)-spaces of a vector capacity
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Publication:1697778
DOI10.1016/j.fss.2017.05.014zbMath1382.28018OpenAlexW2614600595MaRDI QIDQ1697778
Enrique Alfonso Sánchez-Pérez, Olvido Delgado
Publication date: 20 February 2018
Published in: Fuzzy Sets and Systems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.fss.2017.05.014
Related Items (2)
Vector valued information measures and integration with respect to fuzzy vector capacities ⋮ A special class of fuzzy measures: Choquet integral and applications
Cites Work
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- A simple proof for the convexity of the Choquet integral
- On the norm with respect to vector measures of the solution of an infinite system of ordinary differential equations
- Citation-based journal ranks: the use of fuzzy measures
- An approach to pseudo-integration of set-valued functions
- The Choquet integral in Riesz space
- Optimal domain for the Hardy operator
- Monotone measures and universal integrals in a uniform framework for the scientific impact assessment problem
- Optimal domain and integral extension of operators, acting in function spaces
- A theory of fuzzy measures: Representations, the Choquet integral, and null sets
- Non-additive measure and integral
- Non-monotonic fuzzy measures and the Choquet integral
- Integrals based on monotone set functions
- Convergence theorems for monotone measures
- Pseudo-\(L^p\) space and convergence
- Capacitary function spaces
- Integration with respect to vector measures
- Theory of capacities
- Mathematical properties of weighted impact factors based on measures of prestige of the citing journals
- Weak Compactness and Vector Measures
- FUZZY MEASURES AND FUZZY INTEGRALS: AN OVERVIEW
- Some properties of the variations of non-additive set functions. I
- Some properties of the variations of non-additive set functions. II
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