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18.06.2018 | Focus

Entropy measures for Atanassov intuitionistic fuzzy sets based on divergence

verfasst von: Ignacio Montes, Nikhil R. Pal, Susana Montes

Erschienen in: Soft Computing | Ausgabe 15/2018

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In the literature, there are two different approaches to define entropy of Atanassov intuitionistic fuzzy sets (AIFS, for short). The first approach, given by Szmidt and Kacprzyk, measures how far is an AIFS from its closest crisp set, while the second approach, given by Burrillo and Bustince, measures how far is an AIFS from its closest fuzzy set. On the other hand, divergence measures are functions that measure how different two AIFSs are. Our work generalizes both types of entropies using local measures of divergence. This results in at least two benefits: depending on the application, one may choose from a wide variety of entropy measures and the local nature provides a natural way of parallel computation of entropy, which is important for large data sets. In this context, we provide the necessary and sufficient conditions for defining entropy measures under both frameworks using divergence measures for AIFS. We show that the usual examples of entropy measures can be obtained as particular cases of our more general framework. Also, we investigate the connection between knowledge measures and divergence measures. Finally, we apply our results in a multi-attribute decision-making problem to obtain the weights of the experts.

Vorheriger Artikel On invariant IF-state

Nächster Artikel An enhanced fuzzy evidential DEMATEL method with its application to identify critical success factors

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The notation we are using here is slightly different from that in Montes et al. (2015), where the set \(\mathcal {D}\) was defined by \(\mathcal {D}=\{(u,v)\in {\mathbb {R}^2}^{+}\mid u+v\le 1\}\), and then we considered \(\mathcal {D}^2\). In this paper, we have considered an alternative expression for \(\mathcal {D}\) in Eq. (2) for the sake of mathematical convenience. However, both approaches are equivalent.

The original definitions of \(D_C\) and \(D_L\) are slightly different from those of Eqs. (9) and (10). The difference is that in Hong and Kim (1999), \(D_C\) was divided by 2 and \(D_L\) by 4, instead of 2. In this paper, we consider the definitions of Eqs. (9) and (10) just to make \(D_C\) and \(D_L\) to satisfy the normalization property mentioned in Sect. 2.3.

Recall that any t-conorm f satisfies \(f(u,v)=1\) if and only if either \(u=1\) or \(v=1\). However, remember that in the statement of Proposition 3 we are restricting the domain of f to the set \([0,1]\times [0,1)\), hence \(f(u,v)=1\) if and only if \(u=1\).

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Titel: Entropy measures for Atanassov intuitionistic fuzzy sets based on divergence
verfasst von: Ignacio Montes
Nikhil R. Pal
Susana Montes
Publikationsdatum: 18.06.2018
Verlag: Springer Berlin Heidelberg
Erschienen in: Soft Computing / Ausgabe 15/2018
Print ISSN: 1432-7643
Elektronische ISSN: 1433-7479
DOI: https://doi.org/10.1007/s00500-018-3318-3

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