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Abstract

In this work, the main theme is to investigate a novel generalized parametric exponential intuitionistic fuzzy divergence measure along with the study of its detailed properties for its authenticity. The applications of this newly developed generalized intuitionistic fuzzy divergence measure have been provided to multi-attribute decision making (MADM). Numerical verification has been illustrated to demonstrate the proposed method for solving multi-attribute decision making problem under fuzzy environment.

Keywords

Fuzzy sets fuzzy divergence measure intuitionistic fuzzy sets generalized exponential intuitionistic fuzzy divergence measure multi-attribute decision making

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References

Atanassov

K.T.

, Intuitionistic fuzzy sets, Fuzzy Sets and Systems20 (1986), 87–96.

Atanassov

K.T.

, Intuitionistic Fuzzy Sets, Springer, Heidelberg, 1999.

Atanassov

K.T.

, Two theorems for intuitionistic fuzzy sets, Fuzzy Sets and Systems110 (2000), 267–269.

Bhandari

and Pal

N.R.

, Some new information measure for fuzzy sets, Information Science67(3) (1993), 209–228.

Chen

S.M.

and Chang

C.H.

, Fuzzy multiattribute decision making based on transformation techniques of intuitionistic fuzzy values and intuitionistic fuzzy geometric averaging operators, Inf. Sci.352-353 (2016), 133–149.

Chen

S.M.

Cheng

S.H.

and Lan

T.C.

, A novel similarity measure between intuitionistic fuzzy sets based on the centroid points of transformed fuzzy numbers with applications to pattern recognition, Inf. Sci.343-344 (2016), 15–40.

Das

Kar

and Pal

, Robust decision making using intuitionistic fuzzy numbers, Granul. Comput. (2017). doi:10.1007/s41066-016-0024-3.

Fan

and Xie

, Distance measures and induced fuzzy entropy, Fuzzy Sets and Systems104(2) (1999), 305–314.

Garg

, A new generalized improved score function of interval valued intuitionistic fuzzy sets and applications in expert systems, Applied Soft Computing38 (2016), 988–999.

10.

Garg

, A novel accuracy function under interval valued pythagorean fuzzy environment for solving multicriteria decision making problem, Journal of Intelligent and Fuzzy Systems31(1) (2016), 529–540.

11.

Garg

, Some series of intuitionistic fuzzy interactive averaging aggregation operators, Springer Plus5(1) (2016), 1–27.

12.

Garg

, Generalized intuitionistic fuzzy interactive geometric interaction operators using Einstein t-norm and t-conorm and their application to decision making, Computer Industrial Engineering101 (2016), 53–69.

13.

Garg

, A new improved score function of an interval-valued Pythagorean fuzzy set based TOPSIS method, International Journal for Uncertainty Quantification7(5) (2017), 463–474.

14.

Kullback

and Leibler

R.A.

, On information and sufficiency, The Annals Mathematical Statistics22(1) (1951), 79–86.

15.

Kullback

, Information Theory and Statistics, Dover Publication, 1968.

16.

Liu

, Multi-attribute decision making method research based on interval vague set and TOPSIS method, Technol. Econ. Dev. Econ.15(3) (2009), 453–463.

17.

Lourenzutti

and Krohling

R.A.

, A study of TODIM in a intuitionstic fuzzy and random environment, Expert Syts. Appl.40(16) (2013), 6459–6468.

18.

Montes

Couso

Gill

and Bertoluzza

, Divergence measures between fuzzy sets, International Journal of Approximate Reasoning30 (2002), 91–105.

19.

Parkash

, On fuzzy symmetric divergence, in: The Fourth Asian Fuzzy System Symposium, vol. 2, 2000, pp. 904–908.

20.

Parkash

and Kumar

, New parametric and non-parametric measures of cross entropy, Canadian Journal of Pure and Applied Sciences10(2) (2016), 3921–3925.

21.

Parkash

and Kumar

, Modified fuzzy divergence measure and its applications to medical diagnosis and MCDM, Risk and Decision Analysis6(3) (2017), 231–237. doi:10.3233/RDA-170126.

22.

Shang

and Jiang

, A note on fuzzy information measures, Pattern Recognition Letters18(5) (1997), 425–432.

23.

Tomar

V.P.

and Ohlan

, New parametric generalized exponential fuzzy divergence measure, Journal of Uncertainty Analysis and Applications2(24) (2014). doi:10.1186/s40467-014-0024-2.

24.

Verma

R.K.

and Sharma

B.D.

, On generalized intuitionistic fuzzy divergence (relative information) and their properties, J. Uncertain Systems6 (2012), 308–320.

25.

Vlachos

I.K.

and Sergiadis

G.D.

, Intuitionistic fuzzy information - application to pattern recognition, Pattern Recognit. Lett.28(2) (2007), 197–206.

26.

Wei

and Ye

, Improved intuitionistic fuzzy cross-entropy and its application to pattern recognitions, Int. Conf. On Intell. Systems and Knowledge Eng. (2010), 114–116.

27.

Zadeh

L.A.

, Fuzzy sets, Information and Control8(3) (1965), 338–353.

28.

Zadeh

L.A.

, Probability measure of fuzzy event, Journal of Mathematical Analysis and Applications23(2) (1968), 421–427.

Multi-attribute decision making based on novel generalized parametric exponential intuitionistic fuzzy divergence measure

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