1. Handling bipolar knowledge with imprecise probabilities
- Author
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Sébastien Destercke, Heuristique et Diagnostic des Systèmes Complexes [Compiègne] (Heudiasyc), and Université de Technologie de Compiègne (UTC)-Centre National de la Recherche Scientifique (CNRS)
- Subjects
BIPOLARITY ,CREDAL SETS ,Proposition ,02 engineering and technology ,THEORIE DES PROBABILITES IMPRECISES ,INFORMATION BIPOLAIRE ,computer.software_genre ,BIPOLARITE ASYMETRIQUE ,01 natural sciences ,[INFO.INFO-AI]Computer Science [cs]/Artificial Intelligence [cs.AI] ,Theoretical Computer Science ,010104 statistics & probability ,Artificial Intelligence ,0202 electrical engineering, electronic engineering, information engineering ,0101 mathematics ,Representation (mathematics) ,UNCERTAINTY REPRESENTATION ,Mathematics ,REPRESENTATION DES INCERTITUDES ,INFORMATION FUSION ,Basis (linear algebra) ,Negative information ,VALEURS DES VARIABLES ,Regular polygon ,Imprecise probability ,Human-Computer Interaction ,Range (mathematics) ,Variable (computer science) ,020201 artificial intelligence & image processing ,Data mining ,computer ,Software - Abstract
Contact: destercke@supagro.inra.fr, sdestercke@gmail.com; International audience; Information is said to be bipolar when it has a positive and a negative part. The problem of representing and processing such bipolar information has recently received a lot of attention in uncertainty theories. In this paper, we are concerned with the representation of asymmetric bipolarity, i.e., with situations where positive and negative information are unrelated and processed in parallel. In this latter case, positive information consists of observations of experiment results, showing what values are possible, whereas negative information consists of constraints (e.g., provided by an expert), restricting the range of possible variable values. Up to now, there are no proposition as to how such bipolar information can be treated in the framework of imprecise probability theory, i.e., when information is represented by convex sets of probabilities. In this paper, we propose the basis of such a framework and provide some illustrative examples.
- Published
- 2011
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