This paper considers the problem of approximating an arbitrary belief function in Dempster-Shafer theory, seen as the imprecise distribution of a random variable with finite range, with a suitable p-box. The quoted p-box is asked to minimize a Choquet-Wasserstein pseudo-distance while satisfying inequality constraints on the corresponding lower/upper quantile function. We show that the computation of the approximating p-box can be carried out efficiently through a generalization of the Dykstra’s algorithm by relying on a proper entropic formulation.
Cinfrignini, A., Lorenzini, S., Petturiti, D., Vantaggi, B. (2025). Quantile-constrained Choquet-Wasserstein p-box approximation of arbitrary belief functions. In 2025 IEEE International Conference on Fuzzy Systems (FUZZ) (pp.1-6) [10.1109/fuzz62266.2025.11152073].
Quantile-constrained Choquet-Wasserstein p-box approximation of arbitrary belief functions
Cinfrignini, Andrea;
2025-01-01
Abstract
This paper considers the problem of approximating an arbitrary belief function in Dempster-Shafer theory, seen as the imprecise distribution of a random variable with finite range, with a suitable p-box. The quoted p-box is asked to minimize a Choquet-Wasserstein pseudo-distance while satisfying inequality constraints on the corresponding lower/upper quantile function. We show that the computation of the approximating p-box can be carried out efficiently through a generalization of the Dykstra’s algorithm by relying on a proper entropic formulation.
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https://hdl.handle.net/11365/1299334