article

Uncertainty measure in evidence theory with its applications

Authors:

Yafei SongAuthors Info & Claims

Applied Intelligence, Volume 48, Issue 7

Pages 1672 - 1688

https://doi.org/10.1007/s10489-017-1024-y

Published: 01 July 2018 Publication History

Abstract

Uncertainty measure in evidence theory supplies a new criterion to assess the quality and quantity of knowledge conveyed by belief structures. As generalizations of uncertainty measure in the probabilistic framework, several uncertainty measures for belief structures have been developed. Among them, aggregate uncertainty AU and the ambiguity measure AM are well known. However, the inconsistency between evidential and probabilistic frameworks causes limitations to existing measures. They are quite insensitive to the change of belief functions. In this paper, we consider the definition of a novel uncertainty measure for belief structures based on belief intervals. Based on the relation between evidence theory and probability theory, belief structures are transformed to belief intervals on singleton subsets, with the belief function Bel and the plausibility function Pl as its lower and upper bounds, respectively. An uncertainty measure SU for belief structures is then defined based on interval probabilities in the framework of evidence theory, without changing the theoretical frameworks. The center and the span of the interval is used to define the total uncertainty degree of the belief structure. It is proved that SU is identical to Shannon entropy and AM for Bayesian belief structures. Moreover, the proposed uncertainty measure has a wider range determined by the cardinality of discernment frame, which is more practical. Numerical examples, applications and related analyses are provided to verify the rationality of our new measure.

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Uncertainty measure in evidence theory with its applications
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cover image Applied Intelligence

Applied Intelligence Volume 48, Issue 7

July 2018

235 pages

ISSN:0924-669X

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Copyright © Copyright © 2018 Springer Science+Business Media, LLC, part of Springer Nature.

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Kluwer Academic Publishers

United States

Publication History

Published: 01 July 2018

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Cited By

Yin ZMa XWang H(2024)A New Divergence Based on the Belief Bhattacharyya Coefficient with an Application in Risk Evaluation of Aircraft Turbine Rotor BladesInternational Journal of Intelligent Systems10.1155/2024/21409192024Online publication date: 1-Jan-2024
https://dl.acm.org/doi/10.1155/2024/2140919
Zhang GSong YYu GLi Z(2024)New uncertainty measurement for a decision table with application to feature selectionApplied Intelligence10.1007/s10489-024-05310-754:4(3092-3118)Online publication date: 1-Feb-2024
https://dl.acm.org/doi/10.1007/s10489-024-05310-7
Liu MHsu FHuang C(2024)Complex event recognition and anomaly detection with event behavior modelPattern Analysis & Applications10.1007/s10044-024-01275-y27:2Online publication date: 30-Apr-2024
https://dl.acm.org/doi/10.1007/s10044-024-01275-y
Zhou QPedrycz WLiang YDeng Y(2023)Information Granule Based Uncertainty Measure of Fuzzy Evidential DistributionIEEE Transactions on Fuzzy Systems10.1109/TFUZZ.2023.328471331:12(4385-4396)Online publication date: 1-Dec-2023
https://dl.acm.org/doi/10.1109/TFUZZ.2023.3284713
Wang ZZhou QDeng Y(2023)Belief entropy rate: a method to measure the uncertainty of interval-valued stochastic processesApplied Intelligence10.1007/s10489-022-04407-153:14(17476-17491)Online publication date: 5-Jan-2023
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Liu YTang YYang ZZhou DLi LWang S(2023)Improved fuzzy evidential DEMATEL method based on two-dimensional correlation coefficient and negation evidenceSoft Computing - A Fusion of Foundations, Methodologies and Applications10.1007/s00500-023-08748-y27:16(11177-11192)Online publication date: 21-Jun-2023
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Arora HNaithani A(2022)Multi-Criteria Decision Making to Logarithmic Pythagorean Fuzzy Entropy Measure Under TOPSIS ApproachInternational Journal of Fuzzy System Applications10.4018/IJFSA.31223711:4(1-23)Online publication date: 21-Oct-2022
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Fan JZhou WWu M(2022)A new method of conflicting evidence management based on non-extensive entropy and Lance distance in uncertain scenariosJournal of Intelligent & Fuzzy Systems: Applications in Engineering and Technology10.3233/JIFS-21248942:6(6117-6129)Online publication date: 1-Jan-2022
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Zhu WLi SZhang HZhang TLi Z(2022)Evaluation of scientific research projects on the basis of evidential reasoning approach under the perspective of expert reliabilityScientometrics10.1007/s11192-021-04201-9127:1(275-298)Online publication date: 1-Jan-2022
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