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01-11-2014 | Foundations

An intuitionistic view of the Dempster–Shafer belief structure

Author: Ronald R. Yager

Published in: Soft Computing | Issue 11/2014

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Abstract

We discuss the Dempster–Shafer belief theory and describe its role in representing imprecise probabilistic information. In particular, we note its use of intervals for representing imprecise probabilities. We note in fuzzy set theory that there are two related approaches used for representing imprecise membership grades: interval-valued fuzzy sets and intuitionistic fuzzy sets. We indicate the first of these, interval-valued fuzzy sets, is in the same spirit as Dempster–Shafer representation, both use intervals. Using a relationship analogous to the type of relationship that exists between interval-valued fuzzy sets and intuitionistic fuzzy sets, we obtain from the interval-valued view of the Dempster–Shafer model an intuitionistic view of the Dempster–Shafer model. Central to this view is the use of an intuitionistic statement, pair of values, (Bel(A) Dis(A)), to convey information about the value of a variable lying in the set A. We suggest methods for combining intuitionistic statements and making inferences from these type propositions.

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Atanassov KT (1986) Intuitionistic fuzzy sets. Fuzzy Sets Syst 20:87–96MathSciNetCrossRefMATH

Atanassov KT, Gargov G (1989) Interval valued intuitionistic fuzzy sets. Fuzzy Sets Syst 31:343–349MathSciNetCrossRefMATH

Atanassov KT (2012) On intuitionistic fuzzy sets theory. Springer, HeidelbergCrossRefMATH

Bustince H, Burrillo P (1996) Vague sets are intuitionistic fuzzy sets. Fuzzy Sets Syst 79:403–405CrossRefMATH

Cornelis C, Atanassov KT, Kerre EE (2003) Intuitionistic fuzzy sets and interval valued fuzzy sets: a critical comparison. In: Proceedings of Third European Conference on Fuzzy Logic Technology (EUSFLAT) Zittau, Germany, pp 227–235

DeLuca A, Termini S (1972) A definition of a non-probabilistic entropy in the setting of fuzzy sets. Inf Control 20:301–312MathSciNetCrossRef

Dempster AP (1966) New methods of reasoning toward posterior distributions based on sample data. Ann Math Stat 37:355–374MathSciNetCrossRefMATH

Dempster AP (1967) Upper and lower probabilities induced by a multi-valued mapping. Ann Math Stat 38:325–339MathSciNetCrossRefMATH

Dempster AP (1968) A generalization of Bayesian inference. J R Stat Soc 30:205–247MathSciNetMATH

Dempster AP (2008) The Dempster-Shafer calculus for statisticians. Int J Approx Reason 48:365–377MathSciNetCrossRefMATH

Denoeux T (1998) Allowing imprecision in belief representation using fuzzy-valued belief structures. In: Proceedings Seventh International Conference on Information Processing and Management of Uncertainty in Knowledge-Based Systems, Paris, IPMU’98, vol 1, pp 48–55

Denoeux T (1999) Reasoning with imprecise belief structures. Int J Approx Reason 20:79–111MathSciNetCrossRefMATH

Deschrijver G, Kerre EE (2003) On the relationship between some extensions of fuzzy set theory. Fuzzy Sets Syst 133:227–235MathSciNetCrossRefMATH

Dymova L, Sevastjantov P (2012) The operations on intuitionistic fuzzy values in the framework of Dempster-Shafer theory. Knowl Based Syst 35:132–143CrossRef

Dymova L, Sevastjantov P (2010) An interpretation of intuitionistic fuzzy sets in the framework of the Dempster-Shafer theory. In: Rutkowski L (ed) ICAISC 2010, Part 1, LNAI 6113, pp 66–73

Dymova L, Sevastjantov P (2010), An interpretation of intuitionistic fuzzy sets in terms of evidence theory decision making aspects. Knowl Based Syst 23:772–782

Ferson S, Kreinovich V, Ginzburg L, Sentz K, Myers DS (2002) Constructing probability boxes and Dempster-Shafer structures, Technical Report Sand 2002–4015. Sandia National Laboratories, Albuquerque

Flaminio T, Godo L, Marchioni E (2013) Logics for belief functions on MV-algebras. Int J Approx Reason 54:491–512MathSciNetCrossRefMATH

Karnik NN, Mendel JM (2001) Operations on type-2 fuzzy sets. Fuzzy Sets Syst 122:327–348MathSciNetCrossRefMATH

Liu L, Yager RR (2008) Classic works of the Dempster-Shafer theory of belief functions: an introduction. In: Yager RR, Liu L (eds) Classic works of the Dempster-Shafer theory of belief functions. Springer, Heidelberg, pp 1–34

Mendel JM, Bob John RI (2002) Type-2 fuzzy sets made simple. IEEE Trans Fuzzy Syst 10:117–127CrossRef

Mendel JM, John RI, Liu F (2006) Interval type-2 fuzzy sets made simple. IEEE Trans Fuzzy Syst 14:808–821CrossRef

Mendel JM, Wu D (2010) Perceptual computing. Wiley, HobokenCrossRef

Mizumoto M, Tanaka K (1976) Some properties of fuzzy sets of type-2. Inf Control 31:312–340MathSciNetCrossRefMATH

Pasi G, Atanassov K, Yager RR (2005) On intuitionistic fuzzy interpretations of elements of utility theory, Part 1. Notes Intuit Fuzzy Sets 11:62–65

Rickard JT, Aisbett J, Yager RR (2010) Type-2 graphical linguistic summarization and analysis. Technical Report #MII-3024 Machine Intelligence Institute. Iona College, New Rochelle

Shafer G (1976) A mathematical theory of evidence. Princeton University Press, PrincetonMATH

Smets P (1988) Non-standard logics for automated reasoning. In: Smets P, Mamdani EH, Dubois D, Prade H (eds) Belief functions. Academic Press, London, pp 253–277

Smets P (1990) The combination of evidence in the transferable belief model. IEEE Trans Pattern Anal Mach Intell 12:321–344CrossRef

Smets P, Kennes R (1994) The transferable belief model. Artif Intell 66:191–234MathSciNetCrossRefMATH

Szmidt E, Kacprzyk J (2001) Entropy for intuitionistic fuzzy sets. Fuzzy Sets Syst 118:467–477MathSciNetCrossRefMATH

Walley P (1982) Statistical analysis with imprecise probabilities. Chapman and Hall, London

Walley P (2000) Toward unified theory of imprecise probability. Int J Approx Reason 24:125–148MathSciNetCrossRefMATH

Wang ZY, Klir GJ (1992) Fuzzy measure theory. Plenum Press, New YorkCrossRefMATH

Xu Z, Yager RR (2009) Intuitionistic and inter-valued fuzzy preference relations and their measure of similarity for the evaluation of agreement within groups. Fuzzy Optim Decis Mak 8:123–139MathSciNetCrossRefMATH

Yager RR, Liu L (2008) In: Dempster AP, Shafer G (eds) Classic works of the Dempster-Shafer theory of belief functions. Springer, Heidelberg

Yager RR (1979) On the measure of fuzziness and negation part I: membership in the unit interval. Int J Gen Syst 5:221–229MathSciNetCrossRefMATH

Yager RR (1980) On the measure of fuzziness and negation part II: lattices. Inf Control 44:236–260MathSciNetCrossRefMATH

Yager RR (1986) The entailment principle for Dempster-Shafer granules. Int J Intell Syst 1:247–262CrossRefMATH

Yager RR (1992) Decision making under Dempster-Shafer uncertainties. Int J Gen Syst 20:233–245CrossRefMATH

Yager RR, Kacprzyk J, Fedrizzi M (1994) Advances in the Dempster-Shafer theory of evidence. Wiley, New YorkMATH

Yager RR (1999) A class of fuzzy measures generated from a Dempster-Shafer belief structure. Int J Intell Syst 14:1239–1247CrossRefMATH

Yager RR (2001) Dempster-Shafer belief structures with interval valued focal weights. Int J Intell Syst 16:497–512CrossRefMATH

Yager RR (2009) Some aspects of intuitionistic fuzzy sets. Fuzzy Optim Decis Mak 8:67–90MathSciNetCrossRefMATH

Yen J (1990) Generalizing the Dempster-Shafer theory to fuzzy sets. IEEE Trans Syst Man Cybern 20:559–570CrossRefMATH

Yen J (1992) Computing generalized belief functions for continuous fuzzy sets. Int J Approx Reason 6:1–31CrossRefMATH

Zadeh LA (1986) A simple view of the Dempster-Shafer theory of evidence and its implication for the rule of combination. AI Mag 7:85–90

Title: An intuitionistic view of the Dempster–Shafer belief structure
Author: Ronald R. Yager
Publication date: 01-11-2014
Publisher: Springer Berlin Heidelberg
Published in: Soft Computing / Issue 11/2014
Print ISSN: 1432-7643
Electronic ISSN: 1433-7479
DOI: https://doi.org/10.1007/s00500-014-1320-y

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