Ternary Kleenean non-additive measures
Beyond two
A framework for multi-source data fusion
Information Sciences: an International Journal - Special issue: Soft computing data mining
Toward a generalized theory of uncertainty (GTU): an outline
Information Sciences—Informatics and Computer Science: An International Journal
Short communication: Uncertainty measures for fuzzy relations and their applications
Applied Soft Computing
Information Sciences: an International Journal
Conditional Dempster-Shafer Theory for Uncertain Knowledge Updating
IFSA '07 Proceedings of the 12th international Fuzzy Systems Association world congress on Foundations of Fuzzy Logic and Soft Computing
Choquet integrals as projection operators for quantified tomographic reconstruction
Fuzzy Sets and Systems
Generalized theory of uncertainty (GTU)-principal concepts and ideas
Computational Statistics & Data Analysis
Fuzzy numbers and fuzzification of the Choquet integral
Fuzzy Sets and Systems
Toward a generalized theory of uncertainty (GTU)--an outline
Information Sciences: an International Journal
Combination rule of D-S evidence theory based on the strategy of cross merging between evidences
Expert Systems with Applications: An International Journal
Particle swarm optimization for determining fuzzy measures from data
Information Sciences: an International Journal
Estimation of fuzzy measures using covariance matrices in Gaussian mixtures
Applied Computational Intelligence and Soft Computing
Importance identification for fault trees based on possibilistic information measurements
Journal of Intelligent & Fuzzy Systems: Applications in Engineering and Technology
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We introduce the fuzzy measure and discuss its use as a unifying structure for modeling knowledge about an uncertain variable. We show that a large class of well-established types of uncertainty representations can be modeled within this framework. A view of the Dempster-Shafer (D-S) belief structure as an uncertainty representation corresponding to a set of possible fuzzy measures is discussed. A methodology for generating this set of fuzzy measures from a belief structure is described. A measure of entropy associated with a fuzzy measure is introduced and its manifestation for different fuzzy measures is described. The problem of uncertain decision making for the case in which the uncertainty represented by a fuzzy measure is considered. The Choquet integral is introduced as providing a generalization of the expected value to this environment