Induced intuitionistic fuzzy Choquet integral operator for multicriteria decision making

Tan, Chunqiao; Chen, Xiaohong

doi:10.1002/int.20489

Cited by 83 publications

(36 citation statements)

References 60 publications

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“…However, the above cited intuitionistic fuzzy operators are based on additive measures and are not suitable to aggregate inter-dependent criteria. To resolve this issue, Tan and Chen [22,23] proposed the intuitionistic fuzzy Choquet integral operator and the generalized interval-valued intuitionistic fuzzy geometric aggregation operator for multiattribute interval-valued intuitionistic fuzzy group decision making problems.…”

mentioning

confidence: 99%

A risk attitudinal ranking method for interval-valued intuitionistic fuzzy numbers based on novel attitudinal expected score and accuracy functions

Wu¹,

Chiclana²

2014

Applied Soft Computing

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mentioning

confidence: 99%

A risk attitudinal ranking method for interval-valued intuitionistic fuzzy numbers based on novel attitudinal expected score and accuracy functions

Wu¹,

Chiclana²

2014

Applied Soft Computing

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“…The Choquet integral, a numeric-based approach, is represented by intervals [28][29][30][31][32]. A Choquet integral is an extension of the standard fuzzy integral [33].…”

Section: Generalised Choquet Integral (Gci)mentioning

confidence: 99%

A Two-Phased Multi-Criteria Decision-Making Approach for Selecting the Best Smartphone

Yıldız

Ergul

2015

SAJIE

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In the last 20 years, rapid and significant developments have occurred in communication and information technologies. In parallel with these developments, the importance of smartphones has increased. In addition, many smartphone manufacturers have launched and continue to launch a number of new models with many features. People who want to buy a new smartphone have difficulties selecting the best smartphone among the numerous models available on the technology markets. Therefore, smartphone selection has become a complex multi-criteria decision-making (MCDM) problem for people. Hence, decision-making processes will be facilitated by using MCDM methods, and these will provide the most appropriate decision. In this paper, the best smartphone among the 28 alternatives determined by the person who will buy them are selected by using three main criteria and 17 sub-criteria with the help of a two-phased MCDM approach. In the first phase, 28 smartphone alternatives are ranked using the analytic network process (ANP). In the second phase, a model that includes the best four alternatives of ANP is created. Afterwards, the best smartphone is selected using the generalised Choquet integral (GCI) method according to this model. Finally, the findings and the results are given. OPSOMMINGGedurende die afgelope twintig jaar het daar vinnige en noemenswaardige ontwikkeling in die kommunikasie en informasie tegnologie geskied. In parallel hiermee het die belangrikheid van slimtelefone toegeneem. Daarmee saam stel slimtelefoon-vervaardigers gereeld nuwe modelle met nuwe funksies vry. Dit is dus moeilik vir 'n potensiële kliënt om die beste seleksie uit die groot verskeidenheid tot hul beskikking te maak. Slimtelefoonseleksie is 'n ingewikkelde multi-kriteria besluitnemingsprobleem. Die besluitnemingsproses word dus gefasiliteer deur gebruik te maak van multi-kriteria besluitnemingsmetodes. Hierdie artikel bepaal die beste slimtelefoon vanuit agt-en-twintig alternatiewe deur gebruik te maak van drie hoof kriteria en sewentien subkriteria met die hulp van 'n twee-ledige multi-kriteria besluitnemingsbenadering. Eerstens word die agt-entwintig alternatiewe met behulp van die analitiese netwerk proses gerangskik en daaruit word 'n model, wat uit die vier beste alternatiewe bestaan, geskep. Laastens word die beste slimtelefoon gekies deur die veralgemeende Choquet integraal metode op die model toe te pas.

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“…Step 3 We calculate the intuitionistic value associated to each alternative The order of the alternatives is x 2 > x 1 > x 3 > x 4 . Observe that, attending to the preference of the expert given in the FPR, x 1 is preferred over the rest of the alternatives.…”

Section: Algorithmmentioning

confidence: 99%

“…Last years, the use of Atanassov's intuitionistic fuzzy sets in decision making has been widely studied [1,2,3,4,5,6,7]. In these works, the evaluations provided by experts are given in terms of intuitionistic values.…”

Section: Introductionmentioning

confidence: 99%

Weighted Voting Method Using Atanassov's Intuitionistic Fuzzy Preference Relations and Ignorance Functions

Paternain¹,

Jurío²,

Barrenechea³

et al. 2011

Proceedings of the 7th Conference of the European Society for Fuzzy Logic and Technology (EUSFLAT-2011)

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In this work we present a method for constructing an Atanassov's intuitionistic fuzzy preference relation from a fuzzy preference relation that takes into account the ignorance of the expert when evaluating the preferences in the latter. Moreover, we present two algorithms that make use of this method for extending the weighted voting method to the Atanassov's intuitionistic fuzzy setting in decision making problems.

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Induced intuitionistic fuzzy Choquet integral operator for multicriteria decision making

Cited by 83 publications

References 60 publications

A risk attitudinal ranking method for interval-valued intuitionistic fuzzy numbers based on novel attitudinal expected score and accuracy functions

A risk attitudinal ranking method for interval-valued intuitionistic fuzzy numbers based on novel attitudinal expected score and accuracy functions

A Two-Phased Multi-Criteria Decision-Making Approach for Selecting the Best Smartphone

Weighted Voting Method Using Atanassov's Intuitionistic Fuzzy Preference Relations and Ignorance Functions

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